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21
22
23\ifdefined\directlua
24 \directlua{dofile(kpse.find_file('luatex-math.lua'))}
25\fi
26
27
28
29\let \teni = \relax
30\let \seveni = \relax
31\let \fivei = \relax
32\let \tensy = \relax
33\let \sevensy = \relax
34\let \fivesy = \relax
35\let \tenex = \relax
36\let \sevenbf = \relax
37\let \fivebf = \relax
38
39\protected\def\latinmodern
40 {\font\tenrm = file:lmroman10regular.otf:liga;kern;tlig;trep at 10pt
41 \font\sevenrm = file:lmroman7regular.otf:liga;kern;tlig;trep at 7pt
42 \font\fiverm = file:lmroman5regular.otf:liga;kern;tlig;trep at 5pt
43
44 \font\tentt = file:lmmono10regular.otf at 10pt
45 \font\tensl = file:lmromanslant10regular.otf:liga;kern;tlig;trep at 10pt
46 \font\tenit = file:lmroman10italic.otf:liga;kern;tlig;trep at 10pt
47 \font\tenbf = file:lmroman10bold.otf:liga;kern;tlig;trep at 10pt
48 \font\tenbi = file:lmroman10bolditalic.otf:liga;kern;tlig;trep at 10pt
49
50 \font\tenos = file:lmroman10regular.otf:onum;liga;kern;tlig;trep at 10pt
51 \font\sevenos = file:lmroman7regular.otf:onum;liga;kern;tlig;trep at 7pt
52 \font\fiveos = file:lmroman5regular.otf:onum;liga;kern;tlig;trep at 5pt
53
54 \font\mathfonttextupright = file:latinmodernmath.otf:script=math;ssty=0;mathsize=yes at 10pt
55 \font\mathfontscriptupright = file:latinmodernmath.otf:script=math;ssty=1;mathsize=yes at 7pt
56 \font\mathfontscriptscriptupright = file:latinmodernmath.otf:script=math;ssty=2;mathsize=yes at 5pt
57
58 \textfont 0 = \mathfonttextupright
59 \scriptfont 0 = \mathfontscriptupright
60 \scriptscriptfont 0 = \mathfontscriptscriptupright
61
62 \textfont 1 = \tenos
63 \scriptfont 1 = \sevenos
64 \scriptscriptfont 1 = \fiveos
65
66 \tenrm}
67
68\protected\def\lucidabright
69 {\font\tenrm = file:lucidabrightot.otf:liga;kern;tlig;trep at 10pt
70 \font\sevenrm = file:lucidabrightot.otf:liga;kern;tlig;trep at 7pt
71 \font\fiverm = file:lucidabrightot.otf:liga;kern;tlig;trep at 5pt
72
73 \font\tentt = file:lucidasanstypewriterot.otf at 10pt
74 \font\tensl = file:lucidabrightot.otf:slant=0.167;liga;kern;tlig;trep at 10pt
75 \font\tenit = file:lucidabrightotitalic.otf:liga;kern;tlig;trep at 10pt
76 \font\tenbf = file:lucidabrightotdemi.otf:liga;kern;tlig;trep at 10pt
77 \font\tenbi = file:lucidabrightotdemiitalic.otf:liga;kern;tlig;trep at 10pt
78
79 \font\tenos = file:lucidabrightot.otf:onum;liga;kern;tlig;trep at 10pt
80 \font\sevenos = file:lucidabrightot.otf:onum;liga;kern;tlig;trep at 7pt
81 \font\fiveos = file:lucidabrightot.otf:onum;liga;kern;tlig;trep at 5pt
82
83 \font\mathfonttextupright = file:lucidabrightmathot.otf:script=math;ssty=0;mathsize=yes at 10pt
84 \font\mathfontscriptupright = file:lucidabrightmathot.otf:script=math;ssty=1;mathsize=yes at 7pt
85 \font\mathfontscriptscriptupright = file:lucidabrightmathot.otf:script=math;ssty=2;mathsize=yes at 5pt
86
87 \textfont 0 = \mathfonttextupright
88 \scriptfont 0 = \mathfontscriptupright
89 \scriptscriptfont 0 = \mathfontscriptscriptupright
90
91 \textfont 1 = \tenos
92 \scriptfont 1 = \sevenos
93 \scriptscriptfont 1 = \fiveos
94
95 \tenrm}
96
97\ifdefined\directlua
98 \directlua {
99 if arguments["mtx:lucidabright"] then
100 tex.print("\string\\lucidabright")
101 else
102 tex.print("\string\\latinmodern")
103 end
104 }
105\fi
106
107\newtoks\everymathrm
108\newtoks\everymathcal
109\newtoks\everymathit
110\newtoks\everymathsl
111\newtoks\everymathbf
112\newtoks\everymathbi
113\newtoks\everymathtt
114
115
116
117\protected\def\rm{\fam0\relax\the\everymathrm\relax\tenrm\relax}
118\protected\def\it{\fam0\relax\the\everymathit\relax\tenit\relax}
119\protected\def\sl{\fam0\relax\the\everymathsl\relax\tensl\relax}
120\protected\def\bf{\fam0\relax\the\everymathbf\relax\tenbf\relax}
121\protected\def\bi{\fam0\relax\the\everymathbi\relax\tenbi\relax}
122\protected\def\tt{\fam0\relax\the\everymathtt\relax\tentt\relax}
123
124
125
126\everymathrm {
127
128 \Umathcode"0041="0"0"0041
129 \Umathcode"0042="0"0"0042
130 \Umathcode"0043="0"0"0043
131 \Umathcode"0044="0"0"0044
132 \Umathcode"0045="0"0"0045
133 \Umathcode"0046="0"0"0046
134 \Umathcode"0047="0"0"0047
135 \Umathcode"0048="0"0"0048
136 \Umathcode"0049="0"0"0049
137 \Umathcode"004A="0"0"004A
138 \Umathcode"004B="0"0"004B
139 \Umathcode"004C="0"0"004C
140 \Umathcode"004D="0"0"004D
141 \Umathcode"004E="0"0"004E
142 \Umathcode"004F="0"0"004F
143 \Umathcode"0050="0"0"0050
144 \Umathcode"0051="0"0"0051
145 \Umathcode"0052="0"0"0052
146 \Umathcode"0053="0"0"0053
147 \Umathcode"0054="0"0"0054
148 \Umathcode"0055="0"0"0055
149 \Umathcode"0056="0"0"0056
150 \Umathcode"0057="0"0"0057
151 \Umathcode"0058="0"0"0058
152 \Umathcode"0059="0"0"0059
153 \Umathcode"005A="0"0"005A
154 \Umathcode"0061="0"0"0061
155 \Umathcode"0062="0"0"0062
156 \Umathcode"0063="0"0"0063
157 \Umathcode"0064="0"0"0064
158 \Umathcode"0065="0"0"0065
159 \Umathcode"0066="0"0"0066
160 \Umathcode"0067="0"0"0067
161 \Umathcode"0068="0"0"0068
162 \Umathcode"0069="0"0"0069
163 \Umathcode"006A="0"0"006A
164 \Umathcode"006B="0"0"006B
165 \Umathcode"006C="0"0"006C
166 \Umathcode"006D="0"0"006D
167 \Umathcode"006E="0"0"006E
168 \Umathcode"006F="0"0"006F
169 \Umathcode"0070="0"0"0070
170 \Umathcode"0071="0"0"0071
171 \Umathcode"0072="0"0"0072
172 \Umathcode"0073="0"0"0073
173 \Umathcode"0074="0"0"0074
174 \Umathcode"0075="0"0"0075
175 \Umathcode"0076="0"0"0076
176 \Umathcode"0077="0"0"0077
177 \Umathcode"0078="0"0"0078
178 \Umathcode"0079="0"0"0079
179 \Umathcode"007A="0"0"007A
180 \Umathcode"0391="0"0"0391
181 \Umathcode"0392="0"0"0392
182 \Umathcode"0393="0"0"0393
183 \Umathcode"0394="0"0"0394
184 \Umathcode"0395="0"0"0395
185 \Umathcode"0396="0"0"0396
186 \Umathcode"0397="0"0"0397
187 \Umathcode"0398="0"0"0398
188 \Umathcode"0399="0"0"0399
189 \Umathcode"039A="0"0"039A
190 \Umathcode"039B="0"0"039B
191 \Umathcode"039C="0"0"039C
192 \Umathcode"039D="0"0"039D
193 \Umathcode"039E="0"0"039E
194 \Umathcode"039F="0"0"039F
195 \Umathcode"03A0="0"0"03A0
196 \Umathcode"03A1="0"0"03A1
197 \Umathcode"03A3="0"0"03A3
198 \Umathcode"03A4="0"0"03A4
199 \Umathcode"03A5="0"0"03A5
200 \Umathcode"03A6="0"0"03A6
201 \Umathcode"03A7="0"0"03A7
202 \Umathcode"03A8="0"0"03A8
203 \Umathcode"03A9="0"0"03A9
204 \Umathcode"03B1="0"0"03B1
205 \Umathcode"03B2="0"0"03B2
206 \Umathcode"03B3="0"0"03B3
207 \Umathcode"03B4="0"0"03B4
208 \Umathcode"03B5="0"0"03B5
209 \Umathcode"03B6="0"0"03B6
210 \Umathcode"03B7="0"0"03B7
211 \Umathcode"03B8="0"0"03B8
212 \Umathcode"03B9="0"0"03B9
213 \Umathcode"03BA="0"0"03BA
214 \Umathcode"03BB="0"0"03BB
215 \Umathcode"03BC="0"0"03BC
216 \Umathcode"03BD="0"0"03BD
217 \Umathcode"03BE="0"0"03BE
218 \Umathcode"03BF="0"0"03BF
219 \Umathcode"03C0="0"0"03C0
220 \Umathcode"03C1="0"0"03C1
221 \Umathcode"03C2="0"0"03C2
222 \Umathcode"03C3="0"0"03C3
223 \Umathcode"03C4="0"0"03C4
224 \Umathcode"03C5="0"0"03C5
225 \Umathcode"03C6="0"0"03C6
226 \Umathcode"03C7="0"0"03C7
227 \Umathcode"03C8="0"0"03C8
228 \Umathcode"03C9="0"0"03C9
229 \Umathcode"03D1="0"0"03D1
230 \Umathcode"03D5="0"0"03D5
231 \Umathcode"03D6="0"0"03D6
232 \Umathcode"03F0="0"0"03F0
233 \Umathcode"03F1="0"0"03F1
234 \Umathcode"03F4="0"0"03F4
235 \Umathcode"03F5="0"0"03F5
236 \Umathcode"2202="0"0"2202
237 \Umathcode"2207="0"0"2207
238
239 \Umathchardef\Alpha "0"0"000391
240 \Umathchardef\Beta "0"0"000392
241 \Umathchardef\Gamma "0"0"000393
242 \Umathchardef\Delta "0"0"000394
243 \Umathchardef\Epsilon "0"0"000395
244 \Umathchardef\Zeta "0"0"000396
245 \Umathchardef\Eta "0"0"000397
246 \Umathchardef\Theta "0"0"000398
247 \Umathchardef\Iota "0"0"000399
248 \Umathchardef\Kappa "0"0"00039A
249 \Umathchardef\Lambda "0"0"00039B
250 \Umathchardef\Mu "0"0"00039C
251 \Umathchardef\Nu "0"0"00039D
252 \Umathchardef\Xi "0"0"00039E
253 \Umathchardef\Omicron "0"0"00039F
254 \Umathchardef\Pi "0"0"0003A0
255 \Umathchardef\Rho "0"0"0003A1
256 \Umathchardef\Sigma "0"0"0003A3
257 \Umathchardef\Tau "0"0"0003A4
258 \Umathchardef\Upsilon "0"0"0003A5
259 \Umathchardef\Phi "0"0"0003A6
260 \Umathchardef\Chi "0"0"0003A7
261 \Umathchardef\Psi "0"0"0003A8
262 \Umathchardef\Omega "0"0"0003A9
263 \Umathchardef\alpha "0"0"0003B1
264 \Umathchardef\beta "0"0"0003B2
265 \Umathchardef\gamma "0"0"0003B3
266 \Umathchardef\delta "0"0"0003B4
267 \Umathchardef\varepsilon"0"0"0003B5
268 \Umathchardef\zeta "0"0"0003B6
269 \Umathchardef\eta "0"0"0003B7
270 \Umathchardef\theta "0"0"0003B8
271 \Umathchardef\iota "0"0"0003B9
272 \Umathchardef\kappa "0"0"0003BA
273 \Umathchardef\lambda "0"0"0003BB
274 \Umathchardef\mu "0"0"0003BC
275 \Umathchardef\nu "0"0"0003BD
276 \Umathchardef\xi "0"0"0003BE
277 \Umathchardef\omicron "0"0"0003BF
278 \Umathchardef\pi "0"0"0003C0
279 \Umathchardef\rho "0"0"0003C1
280 \Umathchardef\varsigma "0"0"0003C2
281 \Umathchardef\sigma "0"0"0003C3
282 \Umathchardef\tau "0"0"0003C4
283 \Umathchardef\upsilon "0"0"0003C5
284 \Umathchardef\varphi "0"0"0003C6
285 \Umathchardef\chi "0"0"0003C7
286 \Umathchardef\psi "0"0"0003C8
287 \Umathchardef\omega "0"0"0003C9
288 \Umathchardef\vartheta "0"0"0003D1
289 \Umathchardef\phi "0"0"0003D5
290 \Umathchardef\varpi "0"0"0003D6
291 \Umathchardef\varkappa "0"0"0003F0
292 \Umathchardef\varrho "0"0"0003F1
293 \Umathchardef\epsilon "0"0"0003F5
294 \Umathchardef\varTheta "0"0"0003F4
295 \Umathchardef\digamma "0"0"0003DC
296 \relax
297}
298
299\everymathit {
300
301 \Umathcode"0041="0"0"1D434
302 \Umathcode"0042="0"0"1D435
303 \Umathcode"0043="0"0"1D436
304 \Umathcode"0044="0"0"1D437
305 \Umathcode"0045="0"0"1D438
306 \Umathcode"0046="0"0"1D439
307 \Umathcode"0047="0"0"1D43A
308 \Umathcode"0048="0"0"1D43B
309 \Umathcode"0049="0"0"1D43C
310 \Umathcode"004A="0"0"1D43D
311 \Umathcode"004B="0"0"1D43E
312 \Umathcode"004C="0"0"1D43F
313 \Umathcode"004D="0"0"1D440
314 \Umathcode"004E="0"0"1D441
315 \Umathcode"004F="0"0"1D442
316 \Umathcode"0050="0"0"1D443
317 \Umathcode"0051="0"0"1D444
318 \Umathcode"0052="0"0"1D445
319 \Umathcode"0053="0"0"1D446
320 \Umathcode"0054="0"0"1D447
321 \Umathcode"0055="0"0"1D448
322 \Umathcode"0056="0"0"1D449
323 \Umathcode"0057="0"0"1D44A
324 \Umathcode"0058="0"0"1D44B
325 \Umathcode"0059="0"0"1D44C
326 \Umathcode"005A="0"0"1D44D
327 \Umathcode"0061="0"0"1D44E
328 \Umathcode"0062="0"0"1D44F
329 \Umathcode"0063="0"0"1D450
330 \Umathcode"0064="0"0"1D451
331 \Umathcode"0065="0"0"1D452
332 \Umathcode"0066="0"0"1D453
333 \Umathcode"0067="0"0"1D454
334 \Umathcode"0068="0"0"0210E
335 \Umathcode"0069="0"0"1D456
336 \Umathcode"006A="0"0"1D457
337 \Umathcode"006B="0"0"1D458
338 \Umathcode"006C="0"0"1D459
339 \Umathcode"006D="0"0"1D45A
340 \Umathcode"006E="0"0"1D45B
341 \Umathcode"006F="0"0"1D45C
342 \Umathcode"0070="0"0"1D45D
343 \Umathcode"0071="0"0"1D45E
344 \Umathcode"0072="0"0"1D45F
345 \Umathcode"0073="0"0"1D460
346 \Umathcode"0074="0"0"1D461
347 \Umathcode"0075="0"0"1D462
348 \Umathcode"0076="0"0"1D463
349 \Umathcode"0077="0"0"1D464
350 \Umathcode"0078="0"0"1D465
351 \Umathcode"0079="0"0"1D466
352 \Umathcode"007A="0"0"1D467
353 \Umathcode"0391="0"0"1D6E2
354 \Umathcode"0392="0"0"1D6E3
355 \Umathcode"0393="0"0"1D6E4
356 \Umathcode"0394="0"0"1D6E5
357 \Umathcode"0395="0"0"1D6E6
358 \Umathcode"0396="0"0"1D6E7
359 \Umathcode"0397="0"0"1D6E8
360 \Umathcode"0398="0"0"1D6E9
361 \Umathcode"0399="0"0"1D6EA
362 \Umathcode"039A="0"0"1D6EB
363 \Umathcode"039B="0"0"1D6EC
364 \Umathcode"039C="0"0"1D6ED
365 \Umathcode"039D="0"0"1D6EE
366 \Umathcode"039E="0"0"1D6EF
367 \Umathcode"039F="0"0"1D6F0
368 \Umathcode"03A0="0"0"1D6F1
369 \Umathcode"03A1="0"0"1D6F2
370 \Umathcode"03A3="0"0"1D6F4
371 \Umathcode"03A4="0"0"1D6F5
372 \Umathcode"03A5="0"0"1D6F6
373 \Umathcode"03A6="0"0"1D6F7
374 \Umathcode"03A7="0"0"1D6F8
375 \Umathcode"03A8="0"0"1D6F9
376 \Umathcode"03A9="0"0"1D6FA
377 \Umathcode"03B1="0"0"1D6FC
378 \Umathcode"03B2="0"0"1D6FD
379 \Umathcode"03B3="0"0"1D6FE
380 \Umathcode"03B4="0"0"1D6FF
381 \Umathcode"03B5="0"0"1D700
382 \Umathcode"03B6="0"0"1D701
383 \Umathcode"03B7="0"0"1D702
384 \Umathcode"03B8="0"0"1D703
385 \Umathcode"03B9="0"0"1D704
386 \Umathcode"03BA="0"0"1D705
387 \Umathcode"03BB="0"0"1D706
388 \Umathcode"03BC="0"0"1D707
389 \Umathcode"03BD="0"0"1D708
390 \Umathcode"03BE="0"0"1D709
391 \Umathcode"03BF="0"0"1D70A
392 \Umathcode"03C0="0"0"1D70B
393 \Umathcode"03C1="0"0"1D70C
394 \Umathcode"03C2="0"0"1D70D
395 \Umathcode"03C3="0"0"1D70E
396 \Umathcode"03C4="0"0"1D70F
397 \Umathcode"03C5="0"0"1D710
398 \Umathcode"03C6="0"0"1D711
399 \Umathcode"03C7="0"0"1D712
400 \Umathcode"03C8="0"0"1D713
401 \Umathcode"03C9="0"0"1D714
402 \Umathcode"03D1="0"0"1D717
403 \Umathcode"03D5="0"0"1D719
404 \Umathcode"03D6="0"0"1D71B
405 \Umathcode"03F0="0"0"1D718
406 \Umathcode"03F1="0"0"1D71A
407 \Umathcode"03F4="0"0"1D6F3
408 \Umathcode"03F5="0"0"1D716
409 \Umathcode"2202="0"0"1D715
410 \Umathcode"2207="0"0"1D6FB
411
412 \Umathchardef\Alpha "0"0"01D6E2
413 \Umathchardef\Beta "0"0"01D6E3
414 \Umathchardef\Gamma "0"0"01D6E4
415 \Umathchardef\Delta "0"0"01D6E5
416 \Umathchardef\Epsilon "0"0"01D6E6
417 \Umathchardef\Zeta "0"0"01D6E7
418 \Umathchardef\Eta "0"0"01D6E8
419 \Umathchardef\Theta "0"0"01D6E9
420 \Umathchardef\Iota "0"0"01D6EA
421 \Umathchardef\Kappa "0"0"01D6EB
422 \Umathchardef\Lambda "0"0"01D6EC
423 \Umathchardef\Mu "0"0"01D6ED
424 \Umathchardef\Nu "0"0"01D6EE
425 \Umathchardef\Xi "0"0"01D6EF
426 \Umathchardef\Omicron "0"0"01D6F0
427 \Umathchardef\Pi "0"0"01D6F1
428 \Umathchardef\Rho "0"0"01D6F2
429 \Umathchardef\Sigma "0"0"01D6F4
430 \Umathchardef\Tau "0"0"01D6F5
431 \Umathchardef\Upsilon "0"0"01D6F6
432 \Umathchardef\Phi "0"0"01D6F7
433 \Umathchardef\Chi "0"0"01D6F8
434 \Umathchardef\Psi "0"0"01D6F9
435 \Umathchardef\Omega "0"0"01D6FA
436 \Umathchardef\alpha "0"0"01D6FC
437 \Umathchardef\beta "0"0"01D6FD
438 \Umathchardef\gamma "0"0"01D6FE
439 \Umathchardef\delta "0"0"01D6FF
440 \Umathchardef\varepsilon"0"0"01D700
441 \Umathchardef\zeta "0"0"01D701
442 \Umathchardef\eta "0"0"01D702
443 \Umathchardef\theta "0"0"01D703
444 \Umathchardef\iota "0"0"01D704
445 \Umathchardef\kappa "0"0"01D705
446 \Umathchardef\lambda "0"0"01D706
447 \Umathchardef\mu "0"0"01D707
448 \Umathchardef\nu "0"0"01D708
449 \Umathchardef\xi "0"0"01D709
450 \Umathchardef\omicron "0"0"01D70A
451 \Umathchardef\pi "0"0"01D70B
452 \Umathchardef\rho "0"0"01D70C
453 \Umathchardef\varsigma "0"0"01D70D
454 \Umathchardef\sigma "0"0"01D70E
455 \Umathchardef\tau "0"0"01D70F
456 \Umathchardef\upsilon "0"0"01D710
457 \Umathchardef\varphi "0"0"01D711
458 \Umathchardef\chi "0"0"01D712
459 \Umathchardef\psi "0"0"01D713
460 \Umathchardef\omega "0"0"01D714
461 \Umathchardef\epsilon "0"0"01D716
462 \Umathchardef\vartheta "0"0"01D717
463 \Umathchardef\varkappa "0"0"01D718
464 \Umathchardef\phi "0"0"01D719
465 \Umathchardef\varrho "0"0"01D71A
466 \Umathchardef\varpi "0"0"01D71B
467 \Umathchardef\varTheta "0"0"01D6F3
468 \Umathchardef\digamma "0"0"0003DC
469 \relax
470}
471
472\everymathsl {
473 \the\everymathit
474}
475
476\everymathbf {
477
478 \Umathcode"0030="0"0"1D7CE
479 \Umathcode"0031="0"0"1D7CF
480 \Umathcode"0032="0"0"1D7D0
481 \Umathcode"0033="0"0"1D7D1
482 \Umathcode"0034="0"0"1D7D2
483 \Umathcode"0035="0"0"1D7D3
484 \Umathcode"0036="0"0"1D7D4
485 \Umathcode"0037="0"0"1D7D5
486 \Umathcode"0038="0"0"1D7D6
487 \Umathcode"0039="0"0"1D7D7
488 \Umathcode"0041="0"0"1D400
489 \Umathcode"0042="0"0"1D401
490 \Umathcode"0043="0"0"1D402
491 \Umathcode"0044="0"0"1D403
492 \Umathcode"0045="0"0"1D404
493 \Umathcode"0046="0"0"1D405
494 \Umathcode"0047="0"0"1D406
495 \Umathcode"0048="0"0"1D407
496 \Umathcode"0049="0"0"1D408
497 \Umathcode"004A="0"0"1D409
498 \Umathcode"004B="0"0"1D40A
499 \Umathcode"004C="0"0"1D40B
500 \Umathcode"004D="0"0"1D40C
501 \Umathcode"004E="0"0"1D40D
502 \Umathcode"004F="0"0"1D40E
503 \Umathcode"0050="0"0"1D40F
504 \Umathcode"0051="0"0"1D410
505 \Umathcode"0052="0"0"1D411
506 \Umathcode"0053="0"0"1D412
507 \Umathcode"0054="0"0"1D413
508 \Umathcode"0055="0"0"1D414
509 \Umathcode"0056="0"0"1D415
510 \Umathcode"0057="0"0"1D416
511 \Umathcode"0058="0"0"1D417
512 \Umathcode"0059="0"0"1D418
513 \Umathcode"005A="0"0"1D419
514 \Umathcode"0061="0"0"1D41A
515 \Umathcode"0062="0"0"1D41B
516 \Umathcode"0063="0"0"1D41C
517 \Umathcode"0064="0"0"1D41D
518 \Umathcode"0065="0"0"1D41E
519 \Umathcode"0066="0"0"1D41F
520 \Umathcode"0067="0"0"1D420
521 \Umathcode"0068="0"0"1D421
522 \Umathcode"0069="0"0"1D422
523 \Umathcode"006A="0"0"1D423
524 \Umathcode"006B="0"0"1D424
525 \Umathcode"006C="0"0"1D425
526 \Umathcode"006D="0"0"1D426
527 \Umathcode"006E="0"0"1D427
528 \Umathcode"006F="0"0"1D428
529 \Umathcode"0070="0"0"1D429
530 \Umathcode"0071="0"0"1D42A
531 \Umathcode"0072="0"0"1D42B
532 \Umathcode"0073="0"0"1D42C
533 \Umathcode"0074="0"0"1D42D
534 \Umathcode"0075="0"0"1D42E
535 \Umathcode"0076="0"0"1D42F
536 \Umathcode"0077="0"0"1D430
537 \Umathcode"0078="0"0"1D431
538 \Umathcode"0079="0"0"1D432
539 \Umathcode"007A="0"0"1D433
540 \Umathcode"0391="0"0"1D6A8
541 \Umathcode"0392="0"0"1D6A9
542 \Umathcode"0393="0"0"1D6AA
543 \Umathcode"0394="0"0"1D6AB
544 \Umathcode"0395="0"0"1D6AC
545 \Umathcode"0396="0"0"1D6AD
546 \Umathcode"0397="0"0"1D6AE
547 \Umathcode"0398="0"0"1D6AF
548 \Umathcode"0399="0"0"1D6B0
549 \Umathcode"039A="0"0"1D6B1
550 \Umathcode"039B="0"0"1D6B2
551 \Umathcode"039C="0"0"1D6B3
552 \Umathcode"039D="0"0"1D6B4
553 \Umathcode"039E="0"0"1D6B5
554 \Umathcode"039F="0"0"1D6B6
555 \Umathcode"03A0="0"0"1D6B7
556 \Umathcode"03A1="0"0"1D6B8
557 \Umathcode"03A3="0"0"1D6BA
558 \Umathcode"03A4="0"0"1D6BB
559 \Umathcode"03A5="0"0"1D6BC
560 \Umathcode"03A6="0"0"1D6BD
561 \Umathcode"03A7="0"0"1D6BE
562 \Umathcode"03A8="0"0"1D6BF
563 \Umathcode"03A9="0"0"1D6C0
564 \Umathcode"03B1="0"0"1D6C2
565 \Umathcode"03B2="0"0"1D6C3
566 \Umathcode"03B3="0"0"1D6C4
567 \Umathcode"03B4="0"0"1D6C5
568 \Umathcode"03B5="0"0"1D6C6
569 \Umathcode"03B6="0"0"1D6C7
570 \Umathcode"03B7="0"0"1D6C8
571 \Umathcode"03B8="0"0"1D6C9
572 \Umathcode"03B9="0"0"1D6CA
573 \Umathcode"03BA="0"0"1D6CB
574 \Umathcode"03BB="0"0"1D6CC
575 \Umathcode"03BC="0"0"1D6CD
576 \Umathcode"03BD="0"0"1D6CE
577 \Umathcode"03BE="0"0"1D6CF
578 \Umathcode"03BF="0"0"1D6D0
579 \Umathcode"03C0="0"0"1D6D1
580 \Umathcode"03C1="0"0"1D6D2
581 \Umathcode"03C2="0"0"1D6D3
582 \Umathcode"03C3="0"0"1D6D4
583 \Umathcode"03C4="0"0"1D6D5
584 \Umathcode"03C5="0"0"1D6D6
585 \Umathcode"03C6="0"0"1D6D7
586 \Umathcode"03C7="0"0"1D6D8
587 \Umathcode"03C8="0"0"1D6D9
588 \Umathcode"03C9="0"0"1D6DA
589 \Umathcode"03D1="0"0"1D6DD
590 \Umathcode"03D5="0"0"1D6DF
591 \Umathcode"03D6="0"0"1D6E1
592 \Umathcode"03F0="0"0"1D6DE
593 \Umathcode"03F1="0"0"1D6E0
594 \Umathcode"03F4="0"0"1D6B9
595 \Umathcode"03F5="0"0"1D6DC
596 \Umathcode"2202="0"0"1D6DB
597 \Umathcode"2207="0"0"1D6C1
598
599 \Umathchardef\Alpha "0"0"01D6A8
600 \Umathchardef\Beta "0"0"01D6A9
601 \Umathchardef\Gamma "0"0"01D6AA
602 \Umathchardef\Delta "0"0"01D6AB
603 \Umathchardef\Epsilon "0"0"01D6AC
604 \Umathchardef\Zeta "0"0"01D6AD
605 \Umathchardef\Eta "0"0"01D6AE
606 \Umathchardef\Theta "0"0"01D6AF
607 \Umathchardef\Iota "0"0"01D6B0
608 \Umathchardef\Kappa "0"0"01D6B1
609 \Umathchardef\Lambda "0"0"01D6B2
610 \Umathchardef\Mu "0"0"01D6B3
611 \Umathchardef\Nu "0"0"01D6B4
612 \Umathchardef\Xi "0"0"01D6B5
613 \Umathchardef\Omicron "0"0"01D6B6
614 \Umathchardef\Pi "0"0"01D6B7
615 \Umathchardef\Rho "0"0"01D6B8
616 \Umathchardef\Sigma "0"0"01D6BA
617 \Umathchardef\Tau "0"0"01D6BB
618 \Umathchardef\Upsilon "0"0"01D6BC
619 \Umathchardef\Phi "0"0"01D6BD
620 \Umathchardef\Chi "0"0"01D6BE
621 \Umathchardef\Psi "0"0"01D6BF
622 \Umathchardef\Omega "0"0"01D6C0
623 \Umathchardef\alpha "0"0"01D6C2
624 \Umathchardef\beta "0"0"01D6C3
625 \Umathchardef\gamma "0"0"01D6C4
626 \Umathchardef\delta "0"0"01D6C5
627 \Umathchardef\varepsilon"0"0"01D6C6
628 \Umathchardef\zeta "0"0"01D6C7
629 \Umathchardef\eta "0"0"01D6C8
630 \Umathchardef\theta "0"0"01D6C9
631 \Umathchardef\iota "0"0"01D6CA
632 \Umathchardef\kappa "0"0"01D6CB
633 \Umathchardef\lambda "0"0"01D6CC
634 \Umathchardef\mu "0"0"01D6CD
635 \Umathchardef\nu "0"0"01D6CE
636 \Umathchardef\xi "0"0"01D6CF
637 \Umathchardef\omicron "0"0"01D6D0
638 \Umathchardef\pi "0"0"01D6D1
639 \Umathchardef\rho "0"0"01D6D2
640 \Umathchardef\varsigma "0"0"01D6D3
641 \Umathchardef\sigma "0"0"01D6D4
642 \Umathchardef\tau "0"0"01D6D5
643 \Umathchardef\upsilon "0"0"01D6D6
644 \Umathchardef\varphi "0"0"01D6D7
645 \Umathchardef\chi "0"0"01D6D8
646 \Umathchardef\psi "0"0"01D6D9
647 \Umathchardef\omega "0"0"01D6DA
648 \Umathchardef\epsilon "0"0"01D6DC
649 \Umathchardef\vartheta "0"0"01D6DD
650 \Umathchardef\varkappa "0"0"01D6DE
651 \Umathchardef\phi "0"0"01D6DF
652 \Umathchardef\varrho "0"0"01D6E0
653 \Umathchardef\varpi "0"0"01D6E1
654 \Umathchardef\varTheta "0"0"01D6B9
655 \Umathchardef\digamma "0"0"01D7CA
656 \relax
657}
658
659\everymathbi {
660
661 \Umathcode"0030="0"0"1D7CE
662 \Umathcode"0031="0"0"1D7CF
663 \Umathcode"0032="0"0"1D7D0
664 \Umathcode"0033="0"0"1D7D1
665 \Umathcode"0034="0"0"1D7D2
666 \Umathcode"0035="0"0"1D7D3
667 \Umathcode"0036="0"0"1D7D4
668 \Umathcode"0037="0"0"1D7D5
669 \Umathcode"0038="0"0"1D7D6
670 \Umathcode"0039="0"0"1D7D7
671 \Umathcode"0041="0"0"1D468
672 \Umathcode"0042="0"0"1D469
673 \Umathcode"0043="0"0"1D46A
674 \Umathcode"0044="0"0"1D46B
675 \Umathcode"0045="0"0"1D46C
676 \Umathcode"0046="0"0"1D46D
677 \Umathcode"0047="0"0"1D46E
678 \Umathcode"0048="0"0"1D46F
679 \Umathcode"0049="0"0"1D470
680 \Umathcode"004A="0"0"1D471
681 \Umathcode"004B="0"0"1D472
682 \Umathcode"004C="0"0"1D473
683 \Umathcode"004D="0"0"1D474
684 \Umathcode"004E="0"0"1D475
685 \Umathcode"004F="0"0"1D476
686 \Umathcode"0050="0"0"1D477
687 \Umathcode"0051="0"0"1D478
688 \Umathcode"0052="0"0"1D479
689 \Umathcode"0053="0"0"1D47A
690 \Umathcode"0054="0"0"1D47B
691 \Umathcode"0055="0"0"1D47C
692 \Umathcode"0056="0"0"1D47D
693 \Umathcode"0057="0"0"1D47E
694 \Umathcode"0058="0"0"1D47F
695 \Umathcode"0059="0"0"1D480
696 \Umathcode"005A="0"0"1D481
697 \Umathcode"0061="0"0"1D482
698 \Umathcode"0062="0"0"1D483
699 \Umathcode"0063="0"0"1D484
700 \Umathcode"0064="0"0"1D485
701 \Umathcode"0065="0"0"1D486
702 \Umathcode"0066="0"0"1D487
703 \Umathcode"0067="0"0"1D488
704 \Umathcode"0068="0"0"1D489
705 \Umathcode"0069="0"0"1D48A
706 \Umathcode"006A="0"0"1D48B
707 \Umathcode"006B="0"0"1D48C
708 \Umathcode"006C="0"0"1D48D
709 \Umathcode"006D="0"0"1D48E
710 \Umathcode"006E="0"0"1D48F
711 \Umathcode"006F="0"0"1D490
712 \Umathcode"0070="0"0"1D491
713 \Umathcode"0071="0"0"1D492
714 \Umathcode"0072="0"0"1D493
715 \Umathcode"0073="0"0"1D494
716 \Umathcode"0074="0"0"1D495
717 \Umathcode"0075="0"0"1D496
718 \Umathcode"0076="0"0"1D497
719 \Umathcode"0077="0"0"1D498
720 \Umathcode"0078="0"0"1D499
721 \Umathcode"0079="0"0"1D49A
722 \Umathcode"007A="0"0"1D49B
723 \Umathcode"0391="0"0"1D71C
724 \Umathcode"0392="0"0"1D71D
725 \Umathcode"0393="0"0"1D71E
726 \Umathcode"0394="0"0"1D71F
727 \Umathcode"0395="0"0"1D720
728 \Umathcode"0396="0"0"1D721
729 \Umathcode"0397="0"0"1D722
730 \Umathcode"0398="0"0"1D723
731 \Umathcode"0399="0"0"1D724
732 \Umathcode"039A="0"0"1D725
733 \Umathcode"039B="0"0"1D726
734 \Umathcode"039C="0"0"1D727
735 \Umathcode"039D="0"0"1D728
736 \Umathcode"039E="0"0"1D729
737 \Umathcode"039F="0"0"1D72A
738 \Umathcode"03A0="0"0"1D72B
739 \Umathcode"03A1="0"0"1D72C
740 \Umathcode"03A3="0"0"1D72E
741 \Umathcode"03A4="0"0"1D72F
742 \Umathcode"03A5="0"0"1D730
743 \Umathcode"03A6="0"0"1D731
744 \Umathcode"03A7="0"0"1D732
745 \Umathcode"03A8="0"0"1D733
746 \Umathcode"03A9="0"0"1D734
747 \Umathcode"03B1="0"0"1D736
748 \Umathcode"03B2="0"0"1D737
749 \Umathcode"03B3="0"0"1D738
750 \Umathcode"03B4="0"0"1D739
751 \Umathcode"03B5="0"0"1D73A
752 \Umathcode"03B6="0"0"1D73B
753 \Umathcode"03B7="0"0"1D73C
754 \Umathcode"03B8="0"0"1D73D
755 \Umathcode"03B9="0"0"1D73E
756 \Umathcode"03BA="0"0"1D73F
757 \Umathcode"03BB="0"0"1D740
758 \Umathcode"03BC="0"0"1D741
759 \Umathcode"03BD="0"0"1D742
760 \Umathcode"03BE="0"0"1D743
761 \Umathcode"03BF="0"0"1D744
762 \Umathcode"03C0="0"0"1D745
763 \Umathcode"03C1="0"0"1D746
764 \Umathcode"03C2="0"0"1D747
765 \Umathcode"03C3="0"0"1D748
766 \Umathcode"03C4="0"0"1D749
767 \Umathcode"03C5="0"0"1D74A
768 \Umathcode"03C6="0"0"1D74B
769 \Umathcode"03C7="0"0"1D74C
770 \Umathcode"03C8="0"0"1D74D
771 \Umathcode"03C9="0"0"1D74E
772 \Umathcode"03D1="0"0"1D751
773 \Umathcode"03D5="0"0"1D753
774 \Umathcode"03D6="0"0"1D755
775 \Umathcode"03F0="0"0"1D752
776 \Umathcode"03F1="0"0"1D754
777 \Umathcode"03F4="0"0"1D72D
778 \Umathcode"03F5="0"0"1D750
779 \Umathcode"2202="0"0"1D74F
780 \Umathcode"2207="0"0"1D735
781
782 \Umathchardef\Alpha "0"0"01D71C
783 \Umathchardef\Beta "0"0"01D71D
784 \Umathchardef\Gamma "0"0"01D71E
785 \Umathchardef\Delta "0"0"01D71F
786 \Umathchardef\Epsilon "0"0"01D720
787 \Umathchardef\Zeta "0"0"01D721
788 \Umathchardef\Eta "0"0"01D722
789 \Umathchardef\Theta "0"0"01D723
790 \Umathchardef\Iota "0"0"01D724
791 \Umathchardef\Kappa "0"0"01D725
792 \Umathchardef\Lambda "0"0"01D726
793 \Umathchardef\Mu "0"0"01D727
794 \Umathchardef\Nu "0"0"01D728
795 \Umathchardef\Xi "0"0"01D729
796 \Umathchardef\Omicron "0"0"01D72A
797 \Umathchardef\Pi "0"0"01D72B
798 \Umathchardef\Rho "0"0"01D72C
799 \Umathchardef\Sigma "0"0"01D72E
800 \Umathchardef\Tau "0"0"01D72F
801 \Umathchardef\Upsilon "0"0"01D730
802 \Umathchardef\Phi "0"0"01D731
803 \Umathchardef\Chi "0"0"01D732
804 \Umathchardef\Psi "0"0"01D733
805 \Umathchardef\Omega "0"0"01D734
806 \Umathchardef\alpha "0"0"01D736
807 \Umathchardef\beta "0"0"01D737
808 \Umathchardef\gamma "0"0"01D738
809 \Umathchardef\delta "0"0"01D739
810 \Umathchardef\varepsilon"0"0"01D73A
811 \Umathchardef\zeta "0"0"01D73B
812 \Umathchardef\eta "0"0"01D73C
813 \Umathchardef\theta "0"0"01D73D
814 \Umathchardef\iota "0"0"01D73E
815 \Umathchardef\kappa "0"0"01D73F
816 \Umathchardef\lambda "0"0"01D740
817 \Umathchardef\mu "0"0"01D741
818 \Umathchardef\nu "0"0"01D742
819 \Umathchardef\xi "0"0"01D743
820 \Umathchardef\omicron "0"0"01D744
821 \Umathchardef\pi "0"0"01D745
822 \Umathchardef\rho "0"0"01D746
823 \Umathchardef\varsigma "0"0"01D747
824 \Umathchardef\sigma "0"0"01D748
825 \Umathchardef\tau "0"0"01D749
826 \Umathchardef\upsilon "0"0"01D74A
827 \Umathchardef\varphi "0"0"01D74B
828 \Umathchardef\chi "0"0"01D74C
829 \Umathchardef\psi "0"0"01D74D
830 \Umathchardef\omega "0"0"01D74E
831 \Umathchardef\epsilon "0"0"01D750
832 \Umathchardef\vartheta "0"0"01D751
833 \Umathchardef\varkappa "0"0"01D752
834 \Umathchardef\phi "0"0"01D753
835 \Umathchardef\varrho "0"0"01D754
836 \Umathchardef\varpi "0"0"01D755
837 \Umathchardef\varTheta "0"0"01D72D
838 \Umathchardef\digamma "0"0"01D7CA
839 \relax
840}
841
842\everymathtt {
843 \Umathcode"0030="0"0"1D7F6
844 \Umathcode"0031="0"0"1D7F7
845 \Umathcode"0032="0"0"1D7F8
846 \Umathcode"0033="0"0"1D7F9
847 \Umathcode"0034="0"0"1D7FA
848 \Umathcode"0035="0"0"1D7FB
849 \Umathcode"0036="0"0"1D7FC
850 \Umathcode"0037="0"0"1D7FD
851 \Umathcode"0038="0"0"1D7FE
852 \Umathcode"0039="0"0"1D7FF
853 \Umathcode"0041="0"0"1D670
854 \Umathcode"0042="0"0"1D671
855 \Umathcode"0043="0"0"1D672
856 \Umathcode"0044="0"0"1D673
857 \Umathcode"0045="0"0"1D674
858 \Umathcode"0046="0"0"1D675
859 \Umathcode"0047="0"0"1D676
860 \Umathcode"0048="0"0"1D677
861 \Umathcode"0049="0"0"1D678
862 \Umathcode"004A="0"0"1D679
863 \Umathcode"004B="0"0"1D67A
864 \Umathcode"004C="0"0"1D67B
865 \Umathcode"004D="0"0"1D67C
866 \Umathcode"004E="0"0"1D67D
867 \Umathcode"004F="0"0"1D67E
868 \Umathcode"0050="0"0"1D67F
869 \Umathcode"0051="0"0"1D680
870 \Umathcode"0052="0"0"1D681
871 \Umathcode"0053="0"0"1D682
872 \Umathcode"0054="0"0"1D683
873 \Umathcode"0055="0"0"1D684
874 \Umathcode"0056="0"0"1D685
875 \Umathcode"0057="0"0"1D686
876 \Umathcode"0058="0"0"1D687
877 \Umathcode"0059="0"0"1D688
878 \Umathcode"005A="0"0"1D689
879 \Umathcode"0061="0"0"1D68A
880 \Umathcode"0062="0"0"1D68B
881 \Umathcode"0063="0"0"1D68C
882 \Umathcode"0064="0"0"1D68D
883 \Umathcode"0065="0"0"1D68E
884 \Umathcode"0066="0"0"1D68F
885 \Umathcode"0067="0"0"1D690
886 \Umathcode"0068="0"0"1D691
887 \Umathcode"0069="0"0"1D692
888 \Umathcode"006A="0"0"1D693
889 \Umathcode"006B="0"0"1D694
890 \Umathcode"006C="0"0"1D695
891 \Umathcode"006D="0"0"1D696
892 \Umathcode"006E="0"0"1D697
893 \Umathcode"006F="0"0"1D698
894 \Umathcode"0070="0"0"1D699
895 \Umathcode"0071="0"0"1D69A
896 \Umathcode"0072="0"0"1D69B
897 \Umathcode"0073="0"0"1D69C
898 \Umathcode"0074="0"0"1D69D
899 \Umathcode"0075="0"0"1D69E
900 \Umathcode"0076="0"0"1D69F
901 \Umathcode"0077="0"0"1D6A0
902 \Umathcode"0078="0"0"1D6A1
903 \Umathcode"0079="0"0"1D6A2
904 \Umathcode"007A="0"0"1D6A3
905 \relax
906}
907
908
909
910\let\mit\it
911
912
913
914
915
916\protected\def\oldstyle{\fam1\relax\tenos\relax}
917
918
919
920\protected\def\cal{\fam0\relax\the\everymathcal\relax\tenit\relax}
921
922\everymathcal {
923 \Umathcode"0041="0"0"1D49C
924 \Umathcode"0042="0"0"0212C
925 \Umathcode"0043="0"0"1D49E
926 \Umathcode"0044="0"0"1D49F
927 \Umathcode"0045="0"0"02130
928 \Umathcode"0046="0"0"02131
929 \Umathcode"0047="0"0"1D4A2
930 \Umathcode"0048="0"0"0210B
931 \Umathcode"0049="0"0"02110
932 \Umathcode"004A="0"0"1D4A5
933 \Umathcode"004B="0"0"1D4A6
934 \Umathcode"004C="0"0"02112
935 \Umathcode"004D="0"0"02133
936 \Umathcode"004E="0"0"1D4A9
937 \Umathcode"004F="0"0"1D4AA
938 \Umathcode"0050="0"0"1D4AB
939 \Umathcode"0051="0"0"1D4AC
940 \Umathcode"0052="0"0"0211B
941 \Umathcode"0053="0"0"1D4AE
942 \Umathcode"0054="0"0"1D4AF
943 \Umathcode"0055="0"0"1D4B0
944 \Umathcode"0056="0"0"1D4B1
945 \Umathcode"0057="0"0"1D4B2
946 \Umathcode"0058="0"0"1D4B3
947 \Umathcode"0059="0"0"1D4B4
948 \Umathcode"005A="0"0"1D4B5
949 \Umathcode"0061="0"0"1D4B6
950 \Umathcode"0062="0"0"1D4B7
951 \Umathcode"0063="0"0"1D4B8
952 \Umathcode"0064="0"0"1D4B9
953 \Umathcode"0065="0"0"0212F
954 \Umathcode"0066="0"0"1D4BB
955 \Umathcode"0067="0"0"0210A
956 \Umathcode"0068="0"0"1D4BD
957 \Umathcode"0069="0"0"1D4BE
958 \Umathcode"006A="0"0"1D4BF
959 \Umathcode"006B="0"0"1D4C0
960 \Umathcode"006C="0"0"1D4C1
961 \Umathcode"006D="0"0"1D4C2
962 \Umathcode"006E="0"0"1D4C3
963 \Umathcode"006F="0"0"02134
964 \Umathcode"0070="0"0"1D4C5
965 \Umathcode"0071="0"0"1D4C6
966 \Umathcode"0072="0"0"1D4C7
967 \Umathcode"0073="0"0"1D4C8
968 \Umathcode"0074="0"0"1D4C9
969 \Umathcode"0075="0"0"1D4CA
970 \Umathcode"0076="0"0"1D4CB
971 \Umathcode"0077="0"0"1D4CC
972 \Umathcode"0078="0"0"1D4CD
973 \Umathcode"0079="0"0"1D4CE
974 \Umathcode"007A="0"0"1D4CF
975}
976
977\Udelcode "00021 = "0 "00021
978\Udelcode "00028 = "0 "00028
979\Udelcode "00028 = "0 "00028
980\Udelcode "00029 = "0 "00029
981\Udelcode "00029 = "0 "00029
982\Udelcode "0002F = "0 "0002F
983\Udelcode "0002F = "0 "0002F
984\Udelcode "0002F = "0 "02044
985\Udelcode "0003F = "0 "0003F
986\Udelcode "0005B = "0 "0005B
987\Udelcode "0005B = "0 "0005B
988\Udelcode "0005D = "0 "0005D
989\Udelcode "0005D = "0 "0005D
990\Udelcode "0007B = "0 "0007B
991\Udelcode "0007B = "0 "0007B
992\Udelcode "0007C = "0 "0007C
993\Udelcode "0007C = "0 "0007C
994\Udelcode "0007C = "0 "0007C
995\Udelcode "0007C = "0 "0007C
996\Udelcode "0007C = "0 "0007C
997\Udelcode "0007D = "0 "0007D
998\Udelcode "0007D = "0 "0007D
999\Udelcode "02016 = "0 "02016
1000\Udelcode "02016 = "0 "02016
1001\Udelcode "02016 = "0 "02016
1002\Udelcode "02016 = "0 "02016
1003\Udelcode "02016 = "0 "02016
1004\Udelcode "02044 = "0 "02044
1005\Udelcode "02044 = "0 "02044
1006\Udelcode "02308 = "0 "02308
1007\Udelcode "02308 = "0 "02308
1008\Udelcode "02308 = "0 "02308
1009\Udelcode "02308 = "0 "02308
1010\Udelcode "02308 = "0 "02308
1011\Udelcode "02309 = "0 "02309
1012\Udelcode "02309 = "0 "02309
1013\Udelcode "02309 = "0 "02309
1014\Udelcode "02309 = "0 "02309
1015\Udelcode "02309 = "0 "02309
1016\Udelcode "0230A = "0 "0230A
1017\Udelcode "0230A = "0 "0230A
1018\Udelcode "0230B = "0 "0230B
1019\Udelcode "0230B = "0 "0230B
1020\Udelcode "0231C = "0 "0231C
1021\Udelcode "0231C = "0 "0231C
1022\Udelcode "0231D = "0 "0231D
1023\Udelcode "0231D = "0 "0231D
1024\Udelcode "0231E = "0 "0231E
1025\Udelcode "0231E = "0 "0231E
1026\Udelcode "0231F = "0 "0231F
1027\Udelcode "0231F = "0 "0231F
1028\Udelcode "023B0 = "0 "023B0
1029\Udelcode "023B0 = "0 "023B0
1030\Udelcode "023B1 = "0 "023B1
1031\Udelcode "023B1 = "0 "023B1
1032\Udelcode "027E6 = "0 "027E6
1033\Udelcode "027E6 = "0 "027E6
1034\Udelcode "027E7 = "0 "027E7
1035\Udelcode "027E7 = "0 "027E7
1036\Udelcode "027E8 = "0 "027E8
1037\Udelcode "027E8 = "0 "027E8
1038\Udelcode "027E9 = "0 "027E9
1039\Udelcode "027E9 = "0 "027E9
1040\Udelcode "027EA = "0 "027EA
1041\Udelcode "027EA = "0 "027EA
1042\Udelcode "027EB = "0 "027EB
1043\Udelcode "027EB = "0 "027EB
1044\Udelcode "027EE = "0 "027EE
1045\Udelcode "027EE = "0 "027EE
1046\Udelcode "027EF = "0 "027EF
1047\Udelcode "027EF = "0 "027EF
1048
1049\Umathcode "00021 = "5 "0 "00021
1050\Umathcode "00022 = "0 "0 "00022
1051\Umathcode "00027 = "0 "0 "00027
1052\Umathcode "00028 = "4 "0 "00028
1053\Umathcode "00029 = "5 "0 "00029
1054\Umathcode "0002A = "2 "0 "02217
1055\Umathcode "0002B = "2 "0 "0002B
1056\Umathcode "0002C = "6 "0 "0002C
1057\Umathcode "0002D = "2 "0 "02212
1058\Umathcode "0002E = "6 "0 "0002E
1059\Umathcode "0002F = "4 "0 "02044
1060\Umathcode "0003A = "3 "0 "0003A
1061\Umathcode "0003B = "6 "0 "0003B
1062\Umathcode "0003C = "3 "0 "0003C
1063\Umathcode "0003D = "3 "0 "0003D
1064\Umathcode "0003E = "3 "0 "0003E
1065\Umathcode "0003F = "5 "0 "0003F
1066\Umathcode "0005B = "4 "0 "0005B
1067\Umathcode "0005C = "0 "0 "0005C
1068\Umathcode "0005D = "5 "0 "0005D
1069\Umathcode "0007B = "4 "0 "0007B
1070\Umathcode "0007C = "0 "0 "0007C
1071\Umathcode "0007D = "5 "0 "0007D
1072\Umathcode "000A5 = "0 "0 "000A5
1073\Umathcode "000A7 = "0 "0 "000A7
1074\Umathcode "000AC = "0 "0 "000AC
1075\Umathcode "000B1 = "2 "0 "000B1
1076\Umathcode "000B6 = "0 "0 "000B6
1077\Umathcode "000B7 = "2 "0 "000B7
1078\Umathcode "000D7 = "2 "0 "000D7
1079\Umathcode "000F0 = "0 "0 "000F0
1080\Umathcode "000F7 = "2 "0 "000F7
1081\Umathcode "00338 = "3 "0 "00338
1082\Umathcode "003F0 = "0 "0 "003F0
1083\Umathcode "02016 = "0 "0 "02016
1084\Umathcode "02020 = "2 "0 "02020
1085\Umathcode "02021 = "2 "0 "02021
1086\Umathcode "02022 = "2 "0 "02022
1087\Umathcode "02026 = "0 "0 "02026
1088\Umathcode "02032 = "0 "0 "02032
1089\Umathcode "02033 = "0 "0 "02033
1090\Umathcode "02034 = "0 "0 "02034
1091\Umathcode "02044 = "0 "0 "02044
1092\Umathcode "0207A = "2 "0 "0207A
1093\Umathcode "0207B = "2 "0 "0207B
1094\Umathcode "020DD = "0 "0 "020DD
1095\Umathcode "020DE = "0 "0 "020DE
1096\Umathcode "020DF = "0 "0 "020DF
1097\Umathcode "02111 = "0 "0 "02111
1098\Umathcode "02113 = "0 "0 "02113
1099\Umathcode "02118 = "0 "0 "02118
1100\Umathcode "0211C = "0 "0 "0211C
1101\Umathcode "02132 = "0 "0 "02132
1102\Umathcode "02135 = "0 "0 "02135
1103\Umathcode "02136 = "0 "0 "02136
1104\Umathcode "02137 = "0 "0 "02137
1105\Umathcode "02138 = "0 "0 "02138
1106\Umathcode "02141 = "0 "0 "02141
1107\Umathcode "02142 = "0 "0 "02142
1108\Umathcode "02143 = "0 "0 "02143
1109\Umathcode "02144 = "0 "0 "02144
1110\Umathcode "02145 = "0 "0 "02145
1111\Umathcode "02146 = "0 "0 "02146
1112\Umathcode "02147 = "0 "0 "02147
1113\Umathcode "02148 = "0 "0 "02148
1114\Umathcode "02149 = "0 "0 "02149
1115\Umathcode "0214A = "0 "0 "0214A
1116\Umathcode "0214B = "2 "0 "0214B
1117\Umathcode "02190 = "3 "0 "02190
1118\Umathcode "02191 = "3 "0 "02191
1119\Umathcode "02192 = "3 "0 "02192
1120\Umathcode "02193 = "3 "0 "02193
1121\Umathcode "02194 = "3 "0 "02194
1122\Umathcode "02195 = "3 "0 "02195
1123\Umathcode "02196 = "3 "0 "02196
1124\Umathcode "02197 = "3 "0 "02197
1125\Umathcode "02198 = "3 "0 "02198
1126\Umathcode "02199 = "3 "0 "02199
1127\Umathcode "0219A = "3 "0 "0219A
1128\Umathcode "0219B = "3 "0 "0219B
1129\Umathcode "0219C = "3 "0 "0219C
1130\Umathcode "0219D = "3 "0 "0219D
1131\Umathcode "0219E = "3 "0 "0219E
1132\Umathcode "0219F = "3 "0 "0219F
1133\Umathcode "021A0 = "3 "0 "021A0
1134\Umathcode "021A1 = "3 "0 "021A1
1135\Umathcode "021A2 = "3 "0 "021A2
1136\Umathcode "021A3 = "3 "0 "021A3
1137\Umathcode "021A4 = "3 "0 "021A4
1138\Umathcode "021A5 = "3 "0 "021A5
1139\Umathcode "021A6 = "3 "0 "021A6
1140\Umathcode "021A7 = "3 "0 "021A7
1141\Umathcode "021A8 = "0 "0 "021A8
1142\Umathcode "021A9 = "3 "0 "021A9
1143\Umathcode "021AA = "3 "0 "021AA
1144\Umathcode "021AB = "3 "0 "021AB
1145\Umathcode "021AC = "3 "0 "021AC
1146\Umathcode "021AD = "3 "0 "021AD
1147\Umathcode "021AE = "3 "0 "021AE
1148\Umathcode "021AF = "3 "0 "021AF
1149\Umathcode "021B0 = "3 "0 "021B0
1150\Umathcode "021B1 = "3 "0 "021B1
1151\Umathcode "021B2 = "3 "0 "021B2
1152\Umathcode "021B3 = "3 "0 "021B3
1153\Umathcode "021B4 = "0 "0 "021B4
1154\Umathcode "021B5 = "0 "0 "021B5
1155\Umathcode "021B6 = "3 "0 "021B6
1156\Umathcode "021B7 = "3 "0 "021B7
1157\Umathcode "021B8 = "3 "0 "021B8
1158\Umathcode "021B9 = "3 "0 "021B9
1159\Umathcode "021BA = "3 "0 "021BA
1160\Umathcode "021BB = "3 "0 "021BB
1161\Umathcode "021BC = "3 "0 "021BC
1162\Umathcode "021BD = "3 "0 "021BD
1163\Umathcode "021BE = "3 "0 "021BE
1164\Umathcode "021BF = "3 "0 "021BF
1165\Umathcode "021C0 = "3 "0 "021C0
1166\Umathcode "021C1 = "3 "0 "021C1
1167\Umathcode "021C2 = "3 "0 "021C2
1168\Umathcode "021C3 = "3 "0 "021C3
1169\Umathcode "021C4 = "3 "0 "021C4
1170\Umathcode "021C5 = "3 "0 "021C5
1171\Umathcode "021C6 = "3 "0 "021C6
1172\Umathcode "021C7 = "3 "0 "021C7
1173\Umathcode "021C8 = "3 "0 "021C8
1174\Umathcode "021C9 = "3 "0 "021C9
1175\Umathcode "021CA = "3 "0 "021CA
1176\Umathcode "021CB = "3 "0 "021CB
1177\Umathcode "021CC = "3 "0 "021CC
1178\Umathcode "021CD = "3 "0 "021CD
1179\Umathcode "021CE = "3 "0 "021CE
1180\Umathcode "021CF = "3 "0 "021CF
1181\Umathcode "021D0 = "3 "0 "021D0
1182\Umathcode "021D1 = "3 "0 "021D1
1183\Umathcode "021D2 = "3 "0 "021D2
1184\Umathcode "021D3 = "3 "0 "021D3
1185\Umathcode "021D4 = "3 "0 "021D4
1186\Umathcode "021D5 = "3 "0 "021D5
1187\Umathcode "021D6 = "3 "0 "021D6
1188\Umathcode "021D7 = "3 "0 "021D7
1189\Umathcode "021D8 = "3 "0 "021D8
1190\Umathcode "021D9 = "3 "0 "021D9
1191\Umathcode "021DA = "3 "0 "021DA
1192\Umathcode "021DB = "3 "0 "021DB
1193\Umathcode "021DC = "3 "0 "021DC
1194\Umathcode "021DD = "3 "0 "021DD
1195\Umathcode "021DE = "3 "0 "021DE
1196\Umathcode "021DF = "3 "0 "021DF
1197\Umathcode "021E0 = "3 "0 "021E0
1198\Umathcode "021E1 = "3 "0 "021E1
1199\Umathcode "021E2 = "3 "0 "021E2
1200\Umathcode "021E3 = "3 "0 "021E3
1201\Umathcode "021E4 = "3 "0 "021E4
1202\Umathcode "021E5 = "3 "0 "021E5
1203\Umathcode "021E6 = "0 "0 "021E6
1204\Umathcode "021E7 = "0 "0 "021E7
1205\Umathcode "021E8 = "0 "0 "021E8
1206\Umathcode "021E9 = "0 "0 "021E9
1207\Umathcode "021EB = "0 "0 "021EB
1208\Umathcode "021F4 = "3 "0 "021F4
1209\Umathcode "021F5 = "3 "0 "021F5
1210\Umathcode "021F6 = "3 "0 "021F6
1211\Umathcode "021F7 = "3 "0 "021F7
1212\Umathcode "021F8 = "3 "0 "021F8
1213\Umathcode "021F9 = "3 "0 "021F9
1214\Umathcode "021FA = "3 "0 "021FA
1215\Umathcode "021FB = "3 "0 "021FB
1216\Umathcode "021FC = "3 "0 "021FC
1217\Umathcode "021FD = "3 "0 "021FD
1218\Umathcode "021FE = "3 "0 "021FE
1219\Umathcode "021FF = "3 "0 "021FF
1220\Umathcode "02200 = "0 "0 "02200
1221\Umathcode "02201 = "0 "0 "02201
1222\Umathcode "02202 = "0 "0 "02202
1223\Umathcode "02203 = "0 "0 "02203
1224\Umathcode "02204 = "0 "0 "02204
1225\Umathcode "02205 = "0 "0 "02205
1226\Umathcode "02208 = "3 "0 "02208
1227\Umathcode "02209 = "3 "0 "02209
1228\Umathcode "0220B = "3 "0 "0220B
1229\Umathcode "0220C = "3 "0 "0220C
1230\Umathcode "0220F = "1 "0 "0220F
1231\Umathcode "02210 = "1 "0 "02210
1232\Umathcode "02211 = "1 "0 "02211
1233\Umathcode "02212 = "2 "0 "02212
1234\Umathcode "02213 = "2 "0 "02213
1235\Umathcode "02214 = "2 "0 "02214
1236\Umathcode "02216 = "2 "0 "02216
1237\Umathcode "02217 = "2 "0 "02217
1238\Umathcode "02218 = "2 "0 "02218
1239\Umathcode "02219 = "2 "0 "02219
1240\Umathcode "0221D = "3 "0 "0221D
1241\Umathcode "0221E = "0 "0 "0221E
1242\Umathcode "0221F = "0 "0 "0221F
1243\Umathcode "02220 = "0 "0 "02220
1244\Umathcode "02221 = "0 "0 "02221
1245\Umathcode "02222 = "0 "0 "02222
1246\Umathcode "02223 = "2 "0 "02223
1247\Umathcode "02224 = "2 "0 "02224
1248\Umathcode "02225 = "3 "0 "02225
1249\Umathcode "02226 = "3 "0 "02226
1250\Umathcode "02227 = "2 "0 "02227
1251\Umathcode "02228 = "2 "0 "02228
1252\Umathcode "02229 = "2 "0 "02229
1253\Umathcode "0222A = "2 "0 "0222A
1254\Umathcode "0222B = "1 "0 "0222B
1255\Umathcode "0222C = "1 "0 "0222C
1256\Umathcode "0222D = "1 "0 "0222D
1257\Umathcode "0222E = "1 "0 "0222E
1258\Umathcode "0222F = "1 "0 "0222F
1259\Umathcode "02230 = "1 "0 "02230
1260\Umathcode "02231 = "1 "0 "02231
1261\Umathcode "02232 = "1 "0 "02232
1262\Umathcode "02233 = "1 "0 "02233
1263\Umathcode "02234 = "3 "0 "02234
1264\Umathcode "02235 = "3 "0 "02235
1265\Umathcode "02236 = "6 "0 "02236
1266\Umathcode "02237 = "3 "0 "02237
1267\Umathcode "02238 = "2 "0 "02238
1268\Umathcode "02239 = "3 "0 "02239
1269\Umathcode "0223C = "3 "0 "0223C
1270\Umathcode "0223D = "3 "0 "0223D
1271\Umathcode "02240 = "2 "0 "02240
1272\Umathcode "02241 = "3 "0 "02241
1273\Umathcode "02242 = "3 "0 "02242
1274\Umathcode "02243 = "3 "0 "02243
1275\Umathcode "02244 = "3 "0 "02244
1276\Umathcode "02245 = "3 "0 "02245
1277\Umathcode "02246 = "3 "0 "02246
1278\Umathcode "02247 = "3 "0 "02247
1279\Umathcode "02248 = "3 "0 "02248
1280\Umathcode "02249 = "3 "0 "02249
1281\Umathcode "0224A = "3 "0 "0224A
1282\Umathcode "0224C = "3 "0 "0224C
1283\Umathcode "0224D = "3 "0 "0224D
1284\Umathcode "0224E = "3 "0 "0224E
1285\Umathcode "02250 = "3 "0 "02250
1286\Umathcode "02251 = "3 "0 "02251
1287\Umathcode "02252 = "3 "0 "02252
1288\Umathcode "02253 = "3 "0 "02253
1289\Umathcode "02254 = "3 "0 "02254
1290\Umathcode "02255 = "3 "0 "02255
1291\Umathcode "02256 = "3 "0 "02256
1292\Umathcode "02257 = "3 "0 "02257
1293\Umathcode "02259 = "3 "0 "02259
1294\Umathcode "0225A = "3 "0 "0225A
1295\Umathcode "0225B = "3 "0 "0225B
1296\Umathcode "0225C = "3 "0 "0225C
1297\Umathcode "0225D = "3 "0 "0225D
1298\Umathcode "0225E = "3 "0 "0225E
1299\Umathcode "0225F = "3 "0 "0225F
1300\Umathcode "02260 = "3 "0 "02260
1301\Umathcode "02261 = "3 "0 "02261
1302\Umathcode "02262 = "3 "0 "02262
1303\Umathcode "02263 = "3 "0 "02263
1304\Umathcode "02264 = "3 "0 "02264
1305\Umathcode "02265 = "3 "0 "02265
1306\Umathcode "02266 = "3 "0 "02266
1307\Umathcode "02267 = "3 "0 "02267
1308\Umathcode "02268 = "3 "0 "02268
1309\Umathcode "02269 = "3 "0 "02269
1310\Umathcode "0226A = "3 "0 "0226A
1311\Umathcode "0226B = "3 "0 "0226B
1312\Umathcode "0226C = "3 "0 "0226C
1313\Umathcode "0226D = "3 "0 "0226D
1314\Umathcode "0226E = "3 "0 "0226E
1315\Umathcode "0226F = "3 "0 "0226F
1316\Umathcode "02270 = "3 "0 "02270
1317\Umathcode "02271 = "3 "0 "02271
1318\Umathcode "02272 = "3 "0 "02272
1319\Umathcode "02273 = "3 "0 "02273
1320\Umathcode "02274 = "3 "0 "02274
1321\Umathcode "02275 = "3 "0 "02275
1322\Umathcode "02276 = "3 "0 "02276
1323\Umathcode "02277 = "3 "0 "02277
1324\Umathcode "02278 = "3 "0 "02278
1325\Umathcode "02279 = "3 "0 "02279
1326\Umathcode "0227A = "3 "0 "0227A
1327\Umathcode "0227B = "3 "0 "0227B
1328\Umathcode "0227C = "3 "0 "0227C
1329\Umathcode "0227D = "3 "0 "0227D
1330\Umathcode "0227E = "3 "0 "0227E
1331\Umathcode "0227F = "3 "0 "0227F
1332\Umathcode "02280 = "3 "0 "02280
1333\Umathcode "02281 = "3 "0 "02281
1334\Umathcode "02282 = "3 "0 "02282
1335\Umathcode "02283 = "3 "0 "02283
1336\Umathcode "02284 = "3 "0 "02284
1337\Umathcode "02285 = "3 "0 "02285
1338\Umathcode "02286 = "3 "0 "02286
1339\Umathcode "02287 = "3 "0 "02287
1340\Umathcode "02288 = "3 "0 "02288
1341\Umathcode "02289 = "3 "0 "02289
1342\Umathcode "0228A = "3 "0 "0228A
1343\Umathcode "0228B = "3 "0 "0228B
1344\Umathcode "0228E = "2 "0 "0228E
1345\Umathcode "0228F = "3 "0 "0228F
1346\Umathcode "02290 = "3 "0 "02290
1347\Umathcode "02291 = "2 "0 "02291
1348\Umathcode "02292 = "2 "0 "02292
1349\Umathcode "02293 = "2 "0 "02293
1350\Umathcode "02294 = "2 "0 "02294
1351\Umathcode "02295 = "2 "0 "02295
1352\Umathcode "02296 = "2 "0 "02296
1353\Umathcode "02297 = "2 "0 "02297
1354\Umathcode "02298 = "2 "0 "02298
1355\Umathcode "02299 = "2 "0 "02299
1356\Umathcode "0229A = "2 "0 "0229A
1357\Umathcode "0229B = "2 "0 "0229B
1358\Umathcode "0229C = "2 "0 "0229C
1359\Umathcode "0229D = "2 "0 "0229D
1360\Umathcode "0229E = "2 "0 "0229E
1361\Umathcode "0229F = "2 "0 "0229F
1362\Umathcode "022A0 = "2 "0 "022A0
1363\Umathcode "022A1 = "2 "0 "022A1
1364\Umathcode "022A2 = "3 "0 "022A2
1365\Umathcode "022A3 = "3 "0 "022A3
1366\Umathcode "022A4 = "0 "0 "022A4
1367\Umathcode "022A5 = "0 "0 "022A5
1368\Umathcode "022A7 = "3 "0 "022A7
1369\Umathcode "022A8 = "3 "0 "022A8
1370\Umathcode "022A9 = "3 "0 "022A9
1371\Umathcode "022AA = "3 "0 "022AA
1372\Umathcode "022AB = "3 "0 "022AB
1373\Umathcode "022AC = "3 "0 "022AC
1374\Umathcode "022AD = "3 "0 "022AD
1375\Umathcode "022AE = "3 "0 "022AE
1376\Umathcode "022AF = "3 "0 "022AF
1377\Umathcode "022B2 = "2 "0 "022B2
1378\Umathcode "022B3 = "2 "0 "022B3
1379\Umathcode "022B8 = "3 "0 "022B8
1380\Umathcode "022BA = "2 "0 "022BA
1381\Umathcode "022BB = "2 "0 "022BB
1382\Umathcode "022BC = "2 "0 "022BC
1383\Umathcode "022C0 = "1 "0 "022C0
1384\Umathcode "022C1 = "1 "0 "022C1
1385\Umathcode "022C2 = "1 "0 "022C2
1386\Umathcode "022C3 = "1 "0 "022C3
1387\Umathcode "022C4 = "2 "0 "022C4
1388\Umathcode "022C5 = "2 "0 "022C5
1389\Umathcode "022C6 = "2 "0 "022C6
1390\Umathcode "022C7 = "2 "0 "022C7
1391\Umathcode "022C8 = "3 "0 "022C8
1392\Umathcode "022C9 = "2 "0 "022C9
1393\Umathcode "022CA = "2 "0 "022CA
1394\Umathcode "022CB = "2 "0 "022CB
1395\Umathcode "022CC = "2 "0 "022CC
1396\Umathcode "022CE = "2 "0 "022CE
1397\Umathcode "022CF = "2 "0 "022CF
1398\Umathcode "022D0 = "3 "0 "022D0
1399\Umathcode "022D1 = "3 "0 "022D1
1400\Umathcode "022D2 = "2 "0 "022D2
1401\Umathcode "022D3 = "2 "0 "022D3
1402\Umathcode "022D4 = "3 "0 "022D4
1403\Umathcode "022D6 = "2 "0 "022D6
1404\Umathcode "022D7 = "2 "0 "022D7
1405\Umathcode "022D8 = "3 "0 "022D8
1406\Umathcode "022D9 = "3 "0 "022D9
1407\Umathcode "022DA = "3 "0 "022DA
1408\Umathcode "022DB = "3 "0 "022DB
1409\Umathcode "022DC = "3 "0 "022DC
1410\Umathcode "022DD = "3 "0 "022DD
1411\Umathcode "022DE = "3 "0 "022DE
1412\Umathcode "022DF = "3 "0 "022DF
1413\Umathcode "022E0 = "3 "0 "022E0
1414\Umathcode "022E1 = "3 "0 "022E1
1415\Umathcode "022E2 = "3 "0 "022E2
1416\Umathcode "022E3 = "3 "0 "022E3
1417\Umathcode "022E4 = "3 "0 "022E4
1418\Umathcode "022E5 = "3 "0 "022E5
1419\Umathcode "022E6 = "3 "0 "022E6
1420\Umathcode "022E7 = "3 "0 "022E7
1421\Umathcode "022E8 = "3 "0 "022E8
1422\Umathcode "022E9 = "3 "0 "022E9
1423\Umathcode "022EA = "3 "0 "022EA
1424\Umathcode "022EB = "3 "0 "022EB
1425\Umathcode "022EC = "3 "0 "022EC
1426\Umathcode "022ED = "3 "0 "022ED
1427\Umathcode "022EE = "0 "0 "022EE
1428\Umathcode "022EF = "0 "0 "022EF
1429\Umathcode "022F0 = "0 "0 "022F0
1430\Umathcode "022F1 = "0 "0 "022F1
1431\Umathcode "02300 = "0 "0 "02300
1432\Umathcode "02308 = "4 "0 "02308
1433\Umathcode "02309 = "5 "0 "02309
1434\Umathcode "0230A = "4 "0 "0230A
1435\Umathcode "0230B = "5 "0 "0230B
1436\Umathcode "0231C = "4 "0 "0231C
1437\Umathcode "0231D = "5 "0 "0231D
1438\Umathcode "0231E = "4 "0 "0231E
1439\Umathcode "0231F = "5 "0 "0231F
1440\Umathcode "02322 = "3 "0 "02322
1441\Umathcode "02323 = "3 "0 "02323
1442\Umathcode "023B0 = "4 "0 "023B0
1443\Umathcode "023B1 = "5 "0 "023B1
1444\Umathcode "024C7 = "0 "0 "024C7
1445\Umathcode "024C8 = "0 "0 "024C8
1446\Umathcode "025A0 = "0 "0 "025A0
1447\Umathcode "025A1 = "0 "0 "025A1
1448\Umathcode "025A2 = "0 "0 "025A2
1449\Umathcode "025B2 = "2 "0 "025B2
1450\Umathcode "025B3 = "0 "0 "025B3
1451\Umathcode "025B6 = "2 "0 "025B6
1452\Umathcode "025B7 = "2 "0 "025B7
1453\Umathcode "025BC = "2 "0 "025BC
1454\Umathcode "025BD = "2 "0 "025BD
1455\Umathcode "025C0 = "2 "0 "025C0
1456\Umathcode "025C1 = "2 "0 "025C1
1457\Umathcode "025CA = "0 "0 "025CA
1458\Umathcode "025EF = "2 "0 "025EF
1459\Umathcode "02605 = "0 "0 "02605
1460\Umathcode "02660 = "0 "0 "02660
1461\Umathcode "02661 = "0 "0 "02661
1462\Umathcode "02662 = "0 "0 "02662
1463\Umathcode "02663 = "0 "0 "02663
1464\Umathcode "02666 = "0 "0 "02666
1465\Umathcode "0266D = "0 "0 "0266D
1466\Umathcode "0266E = "0 "0 "0266E
1467\Umathcode "0266F = "0 "0 "0266F
1468\Umathcode "02713 = "0 "0 "02713
1469\Umathcode "02720 = "0 "0 "02720
1470\Umathcode "027E6 = "4 "0 "027E6
1471\Umathcode "027E7 = "5 "0 "027E7
1472\Umathcode "027E8 = "4 "0 "027E8
1473\Umathcode "027E9 = "5 "0 "027E9
1474\Umathcode "027EA = "4 "0 "027EA
1475\Umathcode "027EB = "5 "0 "027EB
1476\Umathcode "027EE = "4 "0 "027EE
1477\Umathcode "027EF = "5 "0 "027EF
1478\Umathcode "027F5 = "3 "0 "027F5
1479\Umathcode "027F6 = "3 "0 "027F6
1480\Umathcode "027F7 = "3 "0 "027F7
1481\Umathcode "027F8 = "3 "0 "027F8
1482\Umathcode "027F9 = "3 "0 "027F9
1483\Umathcode "027FA = "3 "0 "027FA
1484\Umathcode "027FB = "3 "0 "027FB
1485\Umathcode "027FC = "3 "0 "027FC
1486\Umathcode "027FD = "3 "0 "027FD
1487\Umathcode "027FE = "3 "0 "027FE
1488\Umathcode "027FF = "3 "0 "027FF
1489\Umathcode "02906 = "3 "0 "02906
1490\Umathcode "02907 = "3 "0 "02907
1491\Umathcode "0290A = "3 "0 "0290A
1492\Umathcode "0290B = "3 "0 "0290B
1493\Umathcode "0290C = "3 "0 "0290C
1494\Umathcode "0290D = "3 "0 "0290D
1495\Umathcode "02911 = "3 "0 "02911
1496\Umathcode "02916 = "3 "0 "02916
1497\Umathcode "02917 = "3 "0 "02917
1498\Umathcode "02921 = "3 "0 "02921
1499\Umathcode "02922 = "3 "0 "02922
1500\Umathcode "02923 = "3 "0 "02923
1501\Umathcode "02924 = "3 "0 "02924
1502\Umathcode "02925 = "3 "0 "02925
1503\Umathcode "02926 = "3 "0 "02926
1504\Umathcode "02A00 = "1 "0 "02A00
1505\Umathcode "02A01 = "1 "0 "02A01
1506\Umathcode "02A02 = "1 "0 "02A02
1507\Umathcode "02A03 = "1 "0 "02A03
1508\Umathcode "02A04 = "1 "0 "02A04
1509\Umathcode "02A05 = "1 "0 "02A05
1510\Umathcode "02A06 = "1 "0 "02A06
1511\Umathcode "02A09 = "1 "0 "02A09
1512\Umathcode "02A3F = "2 "0 "02A3F
1513\Umathcode "02A7D = "3 "0 "02A7D
1514\Umathcode "02A7E = "3 "0 "02A7E
1515\Umathcode "02A85 = "3 "0 "02A85
1516\Umathcode "02A86 = "3 "0 "02A86
1517\Umathcode "02A87 = "3 "0 "02A87
1518\Umathcode "02A88 = "3 "0 "02A88
1519\Umathcode "02A89 = "3 "0 "02A89
1520\Umathcode "02A8A = "3 "0 "02A8A
1521\Umathcode "02A8B = "3 "0 "02A8B
1522\Umathcode "02A8C = "3 "0 "02A8C
1523\Umathcode "02A95 = "3 "0 "02A95
1524\Umathcode "02A96 = "3 "0 "02A96
1525\Umathcode "02AAF = "3 "0 "02AAF
1526\Umathcode "02AB0 = "3 "0 "02AB0
1527\Umathcode "02AB1 = "3 "0 "02AB1
1528\Umathcode "02AB2 = "3 "0 "02AB2
1529\Umathcode "02AB3 = "3 "0 "02AB3
1530\Umathcode "02AB4 = "3 "0 "02AB4
1531\Umathcode "02AB5 = "3 "0 "02AB5
1532\Umathcode "02AB6 = "3 "0 "02AB6
1533\Umathcode "02AB7 = "3 "0 "02AB7
1534\Umathcode "02AB8 = "3 "0 "02AB8
1535\Umathcode "02AB9 = "3 "0 "02AB9
1536\Umathcode "02ABA = "3 "0 "02ABA
1537\Umathcode "02AC5 = "3 "0 "02AC5
1538\Umathcode "02AC6 = "3 "0 "02AC6
1539\Umathcode "02ACB = "3 "0 "02ACB
1540\Umathcode "02ACC = "3 "0 "02ACC
1541\Umathcode "12035 = "0 "0 "12035
1542\Umathcode "1D6A4 = "0 "0 "1D6A4
1543\Umathcode "1D6A5 = "0 "0 "1D6A5
1544\Umathcode "1D6FB = "0 "0 "1D6FB
1545\Umathcode "1D717 = "0 "0 "1D717
1546\Umathcode "1D718 = "0 "0 "1D718
1547
1548
1549
1550
1551
1552
1553
1554
1555
1556
1557
1558
1559
1560
1561
1562
1563
1564
1565
1566
1567
1568
1569
1570
1571
1572
1573
1574
1575
1576
1577\the\everymathit
1578
1579
1580
1581\protected\def\acute {\Umathaccent"0"0"0000B4 }
1582\protected\def\acwopencirclearrow {\Umathchar "3"0"0021BA }
1583\protected\def\aleph {\Umathchar "0"0"002135 }
1584\protected\def\Alpha {\Umathchar "0"0"000391 }
1585\protected\def\alpha {\Umathchar "0"0"0003B1 }
1586\protected\def\amalg {\Umathchar "2"0"002A3F }
1587\protected\def\angle {\Umathchar "0"0"002220 }
1588\protected\def\Angstrom {\Umathchar "0"0"00212B }
1589\protected\def\approx {\Umathchar "3"0"002248 }
1590\protected\def\approxEq {\Umathchar "3"0"002245 }
1591\protected\def\approxeq {\Umathchar "3"0"00224A }
1592\protected\def\approxnEq {\Umathchar "3"0"002247 }
1593\protected\def\arrowvert {\Umathchar "0"0"00007C }
1594\protected\def\Arrowvert {\Umathchar "0"0"002016 }
1595\protected\def\ast {\Umathchar "2"0"002217 }
1596\protected\def\ast {\Umathchar "2"0"002217 }
1597\protected\def\asymp {\Umathchar "3"0"00224D }
1598\protected\def\backepsilon {\Umathchar "0"0"0003F6 }
1599\protected\def\backprime {\Umathchar "0"0"012035 }
1600\protected\def\backsim {\Umathchar "3"0"00223D }
1601\protected\def\backslash {\Umathchar "0"0"00005C }
1602\protected\def\bar {\Umathaccent"0"0"0000AF }
1603\protected\def\barleftarrow {\Umathchar "3"0"0021E4 }
1604\protected\def\barleftarrowrightarrowbar {\Umathchar "3"0"0021B9 }
1605\protected\def\barovernorthwestarrow {\Umathchar "3"0"0021B8 }
1606\protected\def\barwedge {\Umathchar "2"0"0022BC }
1607\protected\def\because {\Umathchar "3"0"002235 }
1608\protected\def\Beta {\Umathchar "0"0"000392 }
1609\protected\def\beta {\Umathchar "0"0"0003B2 }
1610\protected\def\beth {\Umathchar "0"0"002136 }
1611\protected\def\between {\Umathchar "3"0"00226C }
1612\protected\def\bigcap {\Umathchar "1"0"0022C2 }
1613\protected\def\bigcirc {\Umathchar "2"0"0025EF }
1614\protected\def\bigcircle {\Umathchar "2"0"0020DD }
1615\protected\def\bigcircle {\Umathchar "2"0"0020DD }
1616\protected\def\bigcup {\Umathchar "1"0"0022C3 }
1617\protected\def\bigdiamond {\Umathchar "0"0"0020DF }
1618\protected\def\bigodot {\Umathchar "1"0"002A00 }
1619\protected\def\bigoplus {\Umathchar "1"0"002A01 }
1620\protected\def\bigotimes {\Umathchar "1"0"002A02 }
1621\protected\def\bigsqcap {\Umathchar "1"0"002A05 }
1622\protected\def\bigsqcup {\Umathchar "1"0"002A06 }
1623\protected\def\bigsquare {\Umathchar "0"0"0020DE }
1624\protected\def\bigstar {\Umathchar "0"0"002605 }
1625\protected\def\bigtimes {\Umathchar "1"0"002A09 }
1626\protected\def\bigtriangledown {\Umathchar "2"0"0025BD }
1627\protected\def\bigtriangleup {\Umathchar "2"0"0025B3 }
1628\protected\def\bigudot {\Umathchar "1"0"002A03 }
1629\protected\def\biguplus {\Umathchar "1"0"002A04 }
1630\protected\def\bigvee {\Umathchar "1"0"0022C1 }
1631\protected\def\bigwedge {\Umathchar "1"0"0022C0 }
1632\protected\def\blacklozenge {\Umathchar "0"0"002666 }
1633\protected\def\blacksquare {\Umathchar "0"0"0025A0 }
1634\protected\def\blacktriangle {\Umathchar "2"0"0025B2 }
1635\protected\def\blacktriangledown {\Umathchar "2"0"0025BC }
1636\protected\def\blacktriangleleft {\Umathchar "2"0"0025C0 }
1637\protected\def\blacktriangleright {\Umathchar "2"0"0025B6 }
1638\protected\def\bot {\Umathchar "0"0"0022A5 }
1639\protected\def\bowtie {\Umathchar "3"0"0022C8 }
1640\protected\def\Box {\Umathchar "0"0"0025A1 }
1641\protected\def\boxdot {\Umathchar "2"0"0022A1 }
1642\protected\def\boxminus {\Umathchar "2"0"00229F }
1643\protected\def\boxplus {\Umathchar "2"0"00229E }
1644\protected\def\boxtimes {\Umathchar "2"0"0022A0 }
1645
1646
1647
1648
1649\protected\def\breve {\Umathaccent"0"0"0002D8 }
1650\protected\def\bullet {\Umathchar "2"0"002022 }
1651\protected\def\bullet {\Umathchar "2"0"002022 }
1652\protected\def\Bumpeq {\Umathchar "3"0"00224E }
1653\protected\def\cap {\Umathchar "2"0"002229 }
1654\protected\def\Cap {\Umathchar "2"0"0022D2 }
1655\protected\def\carriagereturn {\Umathchar "0"0"0021B5 }
1656\protected\def\cdot {\Umathchar "2"0"0022C5 }
1657\protected\def\cdotp {\Umathchar "6"0"0022C5 }
1658\protected\def\cdots {\Umathchar "0"0"0022EF }
1659\protected\def\centerdot {\Umathchar "2"0"0000B7 }
1660\protected\def\check {\Umathaccent"0"0"0002C7 }
1661\protected\def\checkmark {\Umathchar "0"0"002713 }
1662\protected\def\Chi {\Umathchar "0"0"0003A7 }
1663\protected\def\chi {\Umathchar "0"0"0003C7 }
1664\protected\def\circ {\Umathchar "2"0"002218 }
1665\protected\def\circeq {\Umathchar "3"0"002257 }
1666\protected\def\circlearrowleft {\Umathchar "3"0"0021BB }
1667\protected\def\circlearrowright {\Umathchar "3"0"0021BA }
1668\protected\def\circledast {\Umathchar "2"0"00229B }
1669\protected\def\circledcirc {\Umathchar "2"0"00229A }
1670\protected\def\circleddash {\Umathchar "2"0"00229D }
1671\protected\def\circledequals {\Umathchar "2"0"00229C }
1672\protected\def\circledR {\Umathchar "0"0"0024C7 }
1673\protected\def\circledS {\Umathchar "0"0"0024C8 }
1674\protected\def\circleonrightarrow {\Umathchar "3"0"0021F4 }
1675\protected\def\clubsuit {\Umathchar "0"0"002663 }
1676\protected\def\colon {\Umathchar "6"0"002236 }
1677\protected\def\colonequals {\Umathchar "3"0"002254 }
1678\protected\def\complement {\Umathchar "0"0"002201 }
1679\protected\def\complexes {\Umathchar "0"0"002102 }
1680\protected\def\cong {\Umathchar "3"0"002245 }
1681\protected\def\coprod {\Umathchar "1"0"002210 }
1682\protected\def\cup {\Umathchar "2"0"00222A }
1683\protected\def\Cup {\Umathchar "2"0"0022D3 }
1684\protected\def\curlyeqprec {\Umathchar "3"0"0022DE }
1685\protected\def\curlyeqsucc {\Umathchar "3"0"0022DF }
1686\protected\def\curlyvee {\Umathchar "2"0"0022CE }
1687\protected\def\curlywedge {\Umathchar "2"0"0022CF }
1688\protected\def\curvearrowleft {\Umathchar "3"0"0021B6 }
1689\protected\def\curvearrowright {\Umathchar "3"0"0021B7 }
1690\protected\def\cwopencirclearrow {\Umathchar "3"0"0021BB }
1691\protected\def\dag {\Umathchar "0"0"002020 }
1692\protected\def\dagger {\Umathchar "2"0"002020 }
1693\protected\def\daleth {\Umathchar "0"0"002138 }
1694\protected\def\dasharrow {\Umathchar "3"0"0021E2 }
1695\protected\def\dashedleftarrow {\Umathchar "3"0"00290C }
1696\protected\def\dashedrightarrow {\Umathchar "3"0"00290D }
1697\protected\def\dashv {\Umathchar "3"0"0022A3 }
1698\protected\def\ddag {\Umathchar "0"0"002021 }
1699\protected\def\ddagger {\Umathchar "2"0"002021 }
1700\protected\def\dddot {\Umathaccent"0"0"0020DB }
1701\protected\def\ddot {\Umathaccent"0"0"0000A8 }
1702\protected\def\ddots {\Umathchar "0"0"0022F1 }
1703\protected\def\Ddownarrow {\Umathchar "3"0"00290B }
1704\protected\def\definedeq {\Umathchar "3"0"00225D }
1705\protected\def\Delta {\Umathchar "0"0"000394 }
1706\protected\def\delta {\Umathchar "0"0"0003B4 }
1707\protected\def\diamond {\Umathchar "2"0"0022C4 }
1708\protected\def\diamondsuit {\Umathchar "0"0"002662 }
1709\protected\def\differentialD {\Umathchar "0"0"002145 }
1710\protected\def\differentiald {\Umathchar "0"0"002146 }
1711\protected\def\digamma {\Umathchar "0"0"0003DC }
1712\protected\def\div {\Umathchar "2"0"0000F7 }
1713\protected\def\divideontimes {\Umathchar "2"0"0022C7 }
1714\protected\def\divides {\Umathchar "2"0"002223 }
1715\protected\def\dot {\Umathaccent"0"0"0002D9 }
1716\protected\def\doteq {\Umathchar "3"0"002250 }
1717\protected\def\Doteq {\Umathchar "3"0"002251 }
1718\protected\def\doteqdot {\Umathchar "3"0"002251 }
1719\protected\def\dotminus {\Umathchar "2"0"002238 }
1720\protected\def\dotplus {\Umathchar "2"0"002214 }
1721\protected\def\dots {\Umathchar "0"0"002026 }
1722\protected\def\dottedrightarrow {\Umathchar "3"0"002911 }
1723\protected\def\doublecap {\Umathchar "2"0"0022D2 }
1724\protected\def\doublecup {\Umathchar "2"0"0022D3 }
1725\protected\def\doubleprime {\Umathchar "0"0"002033 }
1726\protected\def\downarrow {\Umathchar "3"0"002193 }
1727\protected\def\Downarrow {\Umathchar "3"0"0021D3 }
1728\protected\def\downdasharrow {\Umathchar "3"0"0021E3 }
1729\protected\def\downdownarrows {\Umathchar "3"0"0021CA }
1730\protected\def\downharpoonleft {\Umathchar "3"0"0021C3 }
1731\protected\def\downharpoonright {\Umathchar "3"0"0021C2 }
1732\protected\def\downuparrows {\Umathchar "3"0"0021F5 }
1733\protected\def\downwhitearrow {\Umathchar "0"0"0021E9 }
1734\protected\def\downzigzagarrow {\Umathchar "3"0"0021AF }
1735\protected\def\ell {\Umathchar "0"0"002113 }
1736\protected\def\emptyset {\Umathchar "0"0"002205 }
1737\protected\def\Epsilon {\Umathchar "0"0"000395 }
1738\protected\def\epsilon {\Umathchar "0"0"0003F5 }
1739\protected\def\eq {\Umathchar "3"0"00003D }
1740\protected\def\eqcirc {\Umathchar "3"0"002256 }
1741\protected\def\eqgtr {\Umathchar "3"0"0022DD }
1742\protected\def\eqless {\Umathchar "3"0"0022DC }
1743\protected\def\eqsim {\Umathchar "3"0"002242 }
1744\protected\def\eqslantgtr {\Umathchar "3"0"002A96 }
1745\protected\def\eqslantless {\Umathchar "3"0"002A95 }
1746\protected\def\equalscolon {\Umathchar "3"0"002255 }
1747\protected\def\equiv {\Umathchar "3"0"002261 }
1748\protected\def\Eta {\Umathchar "0"0"000397 }
1749\protected\def\eta {\Umathchar "0"0"0003B7 }
1750\protected\def\eth {\Umathchar "0"0"0000F0 }
1751\protected\def\Eulerconst {\Umathchar "0"0"002107 }
1752\protected\def\exists {\Umathchar "0"0"002203 }
1753\protected\def\exponentiale {\Umathchar "0"0"002147 }
1754\protected\def\fallingdotseq {\Umathchar "3"0"002252 }
1755\protected\def\Finv {\Umathchar "0"0"002132 }
1756\protected\def\flat {\Umathchar "0"0"00266D }
1757\protected\def\forall {\Umathchar "0"0"002200 }
1758\protected\def\frown {\Umathchar "3"0"002322 }
1759\protected\def\Game {\Umathchar "0"0"002141 }
1760\protected\def\Gamma {\Umathchar "0"0"000393 }
1761\protected\def\gamma {\Umathchar "0"0"0003B3 }
1762\protected\def\ge {\Umathchar "3"0"002265 }
1763\protected\def\geq {\Umathchar "3"0"002265 }
1764\protected\def\geqq {\Umathchar "3"0"002267 }
1765\protected\def\geqslant {\Umathchar "3"0"002A7E }
1766\protected\def\gets {\Umathchar "3"0"002190 }
1767\protected\def\gg {\Umathchar "3"0"00226B }
1768\protected\def\ggg {\Umathchar "3"0"0022D9 }
1769\protected\def\gggtr {\Umathchar "3"0"0022D9 }
1770\protected\def\gimel {\Umathchar "0"0"002137 }
1771\protected\def\gnapprox {\Umathchar "3"0"002A8A }
1772\protected\def\gneqq {\Umathchar "3"0"002269 }
1773\protected\def\gnsim {\Umathchar "3"0"0022E7 }
1774\protected\def\grave {\Umathaccent"0"0"000060 }
1775\protected\def\gt {\Umathchar "3"0"00003E }
1776\protected\def\gtrapprox {\Umathchar "3"0"002A86 }
1777\protected\def\gtrdot {\Umathchar "2"0"0022D7 }
1778\protected\def\gtreqless {\Umathchar "3"0"0022DB }
1779\protected\def\gtreqqless {\Umathchar "3"0"002A8C }
1780\protected\def\gtrless {\Umathchar "3"0"002277 }
1781\protected\def\gtrsim {\Umathchar "3"0"002273 }
1782\protected\def\hat {\Umathaccent"0"0"0002C6 }
1783\protected\def\hbar {\Umathchar "0"0"00210F }
1784\protected\def\heartsuit {\Umathchar "0"0"002661 }
1785\protected\def\hookleftarrow {\Umathchar "3"0"0021A9 }
1786\protected\def\hookrightarrow {\Umathchar "3"0"0021AA }
1787\protected\def\hslash {\Umathchar "0"0"00210F }
1788\protected\def\iiint {\Umathchar "1"0"00222D }
1789\protected\def\iiintop {\Umathchar "0"0"00222D }
1790\protected\def\iint {\Umathchar "1"0"00222C }
1791\protected\def\iintop {\Umathchar "0"0"00222C }
1792\protected\def\Im {\Umathchar "0"0"002111 }
1793\protected\def\imaginaryi {\Umathchar "0"0"002148 }
1794\protected\def\imaginaryj {\Umathchar "0"0"002149 }
1795\protected\def\imath {\Umathchar "0"0"01D6A4 }
1796\protected\def\imply {\Umathchar "3"0"0021D2 }
1797\protected\def\in {\Umathchar "0"0"002208 }
1798\protected\def\infty {\Umathchar "0"0"00221E }
1799\protected\def\int {\Umathchar "1"0"00222B }
1800\protected\def\intclockwise {\Umathchar "1"0"002231 }
1801\protected\def\integers {\Umathchar "0"0"002124 }
1802\protected\def\intercal {\Umathchar "2"0"0022BA }
1803\protected\def\intop {\Umathchar "0"0"00222B }
1804\protected\def\Iota {\Umathchar "0"0"000399 }
1805\protected\def\iota {\Umathchar "0"0"0003B9 }
1806\protected\def\jmath {\Umathchar "0"0"01D6A5 }
1807\protected\def\Join {\Umathchar "3"0"0022C8 }
1808\protected\def\Kappa {\Umathchar "0"0"00039A }
1809\protected\def\kappa {\Umathchar "0"0"0003BA }
1810\protected\def\Lambda {\Umathchar "0"0"00039B }
1811\protected\def\lambda {\Umathchar "0"0"0003BB }
1812\protected\def\land {\Umathchar "2"0"002227 }
1813\protected\def\langle {\Udelimiter "4"0"0027E8 }
1814\protected\def\lbrace {\Udelimiter "4"0"00007B }
1815\protected\def\lbrack {\Udelimiter "4"0"00005B }
1816\protected\def\lceil {\Udelimiter "4"0"002308 }
1817\protected\def\lceiling {\Udelimiter "4"0"002308 }
1818\protected\def\ldotp {\Umathchar "6"0"00002E }
1819\protected\def\ldots {\Umathchar "0"0"002026 }
1820\protected\def\Ldsh {\Umathchar "3"0"0021B2 }
1821\protected\def\le {\Umathchar "3"0"002264 }
1822\protected\def\leadsto {\Umathchar "3"0"0021DD }
1823\protected\def\leftarrow {\Umathchar "3"0"002190 }
1824\protected\def\Leftarrow {\Umathchar "3"0"0021D0 }
1825\protected\def\leftarrowtail {\Umathchar "3"0"0021A2 }
1826\protected\def\leftarrowtriangle {\Umathchar "3"0"0021FD }
1827\protected\def\leftdasharrow {\Umathchar "3"0"0021E0 }
1828\protected\def\leftharpoondown {\Umathchar "3"0"0021BD }
1829\protected\def\leftharpoonup {\Umathchar "3"0"0021BC }
1830\protected\def\leftleftarrows {\Umathchar "3"0"0021C7 }
1831\protected\def\leftrightarrow {\Umathchar "3"0"002194 }
1832\protected\def\Leftrightarrow {\Umathchar "3"0"0021D4 }
1833\protected\def\leftrightarrows {\Umathchar "3"0"0021C6 }
1834\protected\def\leftrightarrowtriangle {\Umathchar "3"0"0021FF }
1835\protected\def\leftrightharpoons {\Umathchar "3"0"0021CB }
1836\protected\def\leftrightsquigarrow {\Umathchar "3"0"0021AD }
1837\protected\def\leftsquigarrow {\Umathchar "3"0"0021DC }
1838\protected\def\leftthreetimes {\Umathchar "2"0"0022CB }
1839\protected\def\leftwavearrow {\Umathchar "3"0"00219C }
1840\protected\def\leftwhitearrow {\Umathchar "0"0"0021E6 }
1841\protected\def\leq {\Umathchar "3"0"002264 }
1842\protected\def\leqq {\Umathchar "3"0"002266 }
1843\protected\def\leqslant {\Umathchar "3"0"002A7D }
1844\protected\def\lessapprox {\Umathchar "3"0"002A85 }
1845\protected\def\lessdot {\Umathchar "2"0"0022D6 }
1846\protected\def\lesseqgtr {\Umathchar "3"0"0022DA }
1847\protected\def\lesseqqgtr {\Umathchar "3"0"002A8B }
1848\protected\def\lessgtr {\Umathchar "3"0"002276 }
1849\protected\def\lesssim {\Umathchar "3"0"002272 }
1850\protected\def\lfloor {\Udelimiter "4"0"00230A }
1851\protected\def\lgroup {\Udelimiter "4"0"0027EE }
1852\protected\def\lhook {\Umathchar "3"0"0FE322 }
1853\protected\def\lhooknwarrow {\Umathchar "3"0"002923 }
1854\protected\def\lhooksearrow {\Umathchar "3"0"002925 }
1855\protected\def\linefeed {\Umathchar "0"0"0021B4 }
1856\protected\def\ll {\Umathchar "3"0"00226A }
1857\protected\def\llangle {\Udelimiter "4"0"0027EA }
1858\protected\def\llbracket {\Udelimiter "4"0"0027E6 }
1859\protected\def\llcorner {\Udelimiter "4"0"00231E }
1860\protected\def\Lleftarrow {\Umathchar "3"0"0021DA }
1861\protected\def\lll {\Umathchar "3"0"0022D8 }
1862\protected\def\llless {\Umathchar "3"0"0022D8 }
1863\protected\def\lmoustache {\Udelimiter "4"0"0023B0 }
1864\protected\def\lnapprox {\Umathchar "3"0"002A89 }
1865\protected\def\lneq {\Umathchar "3"0"002A87 }
1866\protected\def\lneqq {\Umathchar "3"0"002268 }
1867\protected\def\lnot {\Umathchar "0"0"0000AC }
1868\protected\def\lnsim {\Umathchar "3"0"0022E6 }
1869\protected\def\longleftarrow {\Umathchar "3"0"0027F5 }
1870\protected\def\Longleftarrow {\Umathchar "3"0"0027F8 }
1871\protected\def\longleftrightarrow {\Umathchar "3"0"0027F7 }
1872\protected\def\Longleftrightarrow {\Umathchar "3"0"0027FA }
1873\protected\def\longmapsfrom {\Umathchar "3"0"0027FB }
1874\protected\def\Longmapsfrom {\Umathchar "3"0"0027FD }
1875\protected\def\longmapsto {\Umathchar "3"0"0027FC }
1876\protected\def\Longmapsto {\Umathchar "3"0"0027FE }
1877\protected\def\longrightarrow {\Umathchar "3"0"0027F6 }
1878\protected\def\Longrightarrow {\Umathchar "3"0"0027F9 }
1879\protected\def\longrightsquigarrow {\Umathchar "3"0"0027FF }
1880\protected\def\looparrowleft {\Umathchar "3"0"0021AB }
1881\protected\def\looparrowright {\Umathchar "3"0"0021AC }
1882\protected\def\lor {\Umathchar "2"0"002228 }
1883\protected\def\lozenge {\Umathchar "0"0"0025CA }
1884\protected\def\lparent {\Udelimiter "4"0"000028 }
1885\protected\def\lrcorner {\Udelimiter "5"0"00231F }
1886\protected\def\Lsh {\Umathchar "3"0"0021B0 }
1887\protected\def\lt {\Umathchar "3"0"00003C }
1888\protected\def\ltimes {\Umathchar "2"0"0022C9 }
1889\protected\def\lvert {\Udelimiter "4"0"00007C }
1890\protected\def\lVert {\Udelimiter "4"0"002016 }
1891\protected\def\maltese {\Umathchar "0"0"002720 }
1892\protected\def\mapsdown {\Umathchar "3"0"0021A7 }
1893\protected\def\mapsfrom {\Umathchar "3"0"0021A4 }
1894\protected\def\Mapsfrom {\Umathchar "3"0"002906 }
1895\protected\def\mapsfromchar {\Umathchar "3"0"0FE324 }
1896\protected\def\mapsto {\Umathchar "3"0"0021A6 }
1897\protected\def\Mapsto {\Umathchar "3"0"002907 }
1898\protected\def\mapstochar {\Umathchar "3"0"0FE321 }
1899\protected\def\mapsup {\Umathchar "3"0"0021A5 }
1900\protected\def\mathring {\Umathaccent"0"0"0002DA }
1901\protected\def\measuredangle {\Umathchar "0"0"002221 }
1902\protected\def\measuredeq {\Umathchar "3"0"00225E }
1903\protected\def\mho {\Umathchar "0"0"002127 }
1904\protected\def\mid {\Umathchar "3"0"00007C }
1905\protected\def\minus {\Umathchar "2"0"002212 }
1906\protected\def\minuscolon {\Umathchar "2"0"002239 }
1907\protected\def\models {\Umathchar "3"0"0022A7 }
1908\protected\def\mp {\Umathchar "2"0"002213 }
1909\protected\def\Mu {\Umathchar "0"0"00039C }
1910\protected\def\mu {\Umathchar "0"0"0003BC }
1911\protected\def\multimap {\Umathchar "3"0"0022B8 }
1912\protected\def\napprox {\Umathchar "3"0"002249 }
1913\protected\def\napproxEq {\Umathchar "3"0"002246 }
1914\protected\def\nasymp {\Umathchar "3"0"00226D }
1915\protected\def\natural {\Umathchar "0"0"00266E }
1916\protected\def\naturalnumbers {\Umathchar "0"0"002115 }
1917\protected\def\ncong {\Umathchar "3"0"002246 }
1918\protected\def\ndivides {\Umathchar "2"0"002224 }
1919\protected\def\ne {\Umathchar "3"0"002260 }
1920\protected\def\nearrow {\Umathchar "3"0"002197 }
1921\protected\def\Nearrow {\Umathchar "3"0"0021D7 }
1922\protected\def\neg {\Umathchar "0"0"0000AC }
1923\protected\def\negativesign {\Umathchar "2"0"00207B }
1924\protected\def\neq {\Umathchar "3"0"002260 }
1925\protected\def\nequiv {\Umathchar "3"0"002262 }
1926\protected\def\neswarrow {\Umathchar "3"0"002922 }
1927\protected\def\nexists {\Umathchar "0"0"002204 }
1928\protected\def\ngeq {\Umathchar "3"0"002271 }
1929\protected\def\ngtr {\Umathchar "3"0"00226F }
1930\protected\def\ngtrless {\Umathchar "3"0"002279 }
1931\protected\def\ngtrsim {\Umathchar "3"0"002275 }
1932\protected\def\nHdownarrow {\Umathchar "3"0"0021DF }
1933\protected\def\nHuparrow {\Umathchar "3"0"0021DE }
1934\protected\def\ni {\Umathchar "3"0"00220B }
1935\protected\def\nin {\Umathchar "3"0"002209 }
1936\protected\def\nleftarrow {\Umathchar "3"0"00219A }
1937\protected\def\nLeftarrow {\Umathchar "3"0"0021CD }
1938\protected\def\nleftrightarrow {\Umathchar "3"0"0021AE }
1939\protected\def\nLeftrightarrow {\Umathchar "3"0"0021CE }
1940\protected\def\nleq {\Umathchar "3"0"002270 }
1941\protected\def\nless {\Umathchar "3"0"00226E }
1942\protected\def\nlessgtr {\Umathchar "3"0"002278 }
1943\protected\def\nlesssim {\Umathchar "3"0"002274 }
1944\protected\def\nmid {\Umathchar "3"0"002224 }
1945\protected\def\nni {\Umathchar "3"0"00220C }
1946\protected\def\not {\Umathchar "3"0"000338 }
1947\protected\def\notin {\Umathchar "3"0"002209 }
1948\protected\def\nowns {\Umathchar "3"0"00220C }
1949\protected\def\nparallel {\Umathchar "3"0"002226 }
1950\protected\def\nprec {\Umathchar "3"0"002280 }
1951\protected\def\npreccurlyeq {\Umathchar "3"0"0022E0 }
1952\protected\def\nrightarrow {\Umathchar "3"0"00219B }
1953\protected\def\nRightarrow {\Umathchar "3"0"0021CF }
1954\protected\def\nsim {\Umathchar "3"0"002241 }
1955\protected\def\nsimeq {\Umathchar "3"0"002244 }
1956\protected\def\nsqsubseteq {\Umathchar "3"0"0022E2 }
1957\protected\def\nsqsupseteq {\Umathchar "3"0"0022E3 }
1958\protected\def\nsubset {\Umathchar "3"0"002284 }
1959\protected\def\nsubseteq {\Umathchar "3"0"002288 }
1960\protected\def\nsucc {\Umathchar "3"0"002281 }
1961\protected\def\nsucccurlyeq {\Umathchar "3"0"0022E1 }
1962\protected\def\nsupset {\Umathchar "3"0"002285 }
1963\protected\def\nsupseteq {\Umathchar "3"0"002289 }
1964\protected\def\ntriangleleft {\Umathchar "3"0"0022EB }
1965\protected\def\ntrianglelefteq {\Umathchar "3"0"0022EC }
1966\protected\def\ntriangleright {\Umathchar "3"0"0022EA }
1967\protected\def\ntrianglerighteq {\Umathchar "3"0"0022ED }
1968\protected\def\Nu {\Umathchar "0"0"00039D }
1969\protected\def\nu {\Umathchar "0"0"0003BD }
1970\protected\def\nvdash {\Umathchar "3"0"0022AC }
1971\protected\def\nvDash {\Umathchar "3"0"0022AD }
1972\protected\def\nVdash {\Umathchar "3"0"0022AE }
1973\protected\def\nVDash {\Umathchar "3"0"0022AF }
1974\protected\def\nvleftarrow {\Umathchar "3"0"0021F7 }
1975\protected\def\nVleftarrow {\Umathchar "3"0"0021FA }
1976\protected\def\nvleftrightarrow {\Umathchar "3"0"0021F9 }
1977\protected\def\nVleftrightarrow {\Umathchar "3"0"0021FC }
1978\protected\def\nvrightarrow {\Umathchar "3"0"0021F8 }
1979\protected\def\nVrightarrow {\Umathchar "3"0"0021FB }
1980\protected\def\nwarrow {\Umathchar "3"0"002196 }
1981\protected\def\Nwarrow {\Umathchar "3"0"0021D6 }
1982\protected\def\nwsearrow {\Umathchar "3"0"002921 }
1983\protected\def\odot {\Umathchar "2"0"002299 }
1984\protected\def\ohm {\Umathchar "0"0"002126 }
1985\protected\def\oiiint {\Umathchar "1"0"002230 }
1986\protected\def\oiint {\Umathchar "1"0"00222F }
1987\protected\def\oint {\Umathchar "1"0"00222E }
1988\protected\def\ointclockwise {\Umathchar "1"0"002232 }
1989\protected\def\ointctrclockwise {\Umathchar "1"0"002233 }
1990\protected\def\Omega {\Umathchar "0"0"0003A9 }
1991\protected\def\omega {\Umathchar "0"0"0003C9 }
1992\protected\def\Omicron {\Umathchar "0"0"00039F }
1993\protected\def\omicron {\Umathchar "0"0"0003BF }
1994\protected\def\ominus {\Umathchar "2"0"002296 }
1995\protected\def\oplus {\Umathchar "2"0"002295 }
1996\protected\def\oslash {\Umathchar "2"0"002298 }
1997\protected\def\otimes {\Umathchar "2"0"002297 }
1998\protected\def\overbar {\Umathaccent"0"0"00203E }
1999\protected\def\overbrace {\Umathaccent"0"0"0023DE }
2000\protected\def\overbracket {\Umathaccent"0"0"0023B4 }
2001\protected\def\overparent {\Umathaccent"0"0"0023DC }
2002\protected\def\owns {\Umathchar "3"0"00220B }
2003\protected\def\P {\Umathchar "0"0"0000B6 }
2004\protected\def\parallel {\Umathchar "3"0"002225 }
2005\protected\def\partial {\Umathchar "0"0"002202 }
2006\protected\def\perp {\Umathchar "3"0"0022A5 }
2007\protected\def\Phi {\Umathchar "0"0"0003A6 }
2008\protected\def\phi {\Umathchar "0"0"0003D5 }
2009\protected\def\Pi {\Umathchar "0"0"0003A0 }
2010\protected\def\pi {\Umathchar "0"0"0003C0 }
2011\protected\def\pitchfork {\Umathchar "3"0"0022D4 }
2012\protected\def\Plankconst {\Umathchar "0"0"00210E }
2013\protected\def\pm {\Umathchar "2"0"0000B1 }
2014\protected\def\positivesign {\Umathchar "2"0"00207A }
2015\protected\def\prec {\Umathchar "3"0"00227A }
2016\protected\def\precapprox {\Umathchar "3"0"002AB7 }
2017\protected\def\preccurlyeq {\Umathchar "3"0"00227C }
2018\protected\def\preceq {\Umathchar "3"0"002AAF }
2019\protected\def\preceqq {\Umathchar "3"0"002AB3 }
2020\protected\def\precnapprox {\Umathchar "3"0"002AB9 }
2021\protected\def\precneq {\Umathchar "3"0"002AB1 }
2022\protected\def\precneqq {\Umathchar "3"0"002AB5 }
2023\protected\def\precnsim {\Umathchar "3"0"0022E8 }
2024\protected\def\precsim {\Umathchar "3"0"00227E }
2025\protected\def\prime {\Umathchar "0"0"002032 }
2026\protected\def\primes {\Umathchar "0"0"002119 }
2027\protected\def\prod {\Umathchar "1"0"00220F }
2028\protected\def\PropertyLine {\Umathchar "0"0"00214A }
2029\protected\def\propto {\Umathchar "3"0"00221D }
2030\protected\def\Psi {\Umathchar "0"0"0003A8 }
2031\protected\def\psi {\Umathchar "0"0"0003C8 }
2032\protected\def\questionedeq {\Umathchar "3"0"00225F }
2033\protected\def\rangle {\Udelimiter "5"0"0027E9 }
2034\protected\def\rationals {\Umathchar "0"0"00211A }
2035\protected\def\rbrace {\Udelimiter "5"0"00007D }
2036\protected\def\rbrack {\Udelimiter "5"0"00005D }
2037\protected\def\rceil {\Udelimiter "5"0"002309 }
2038\protected\def\rceiling {\Udelimiter "5"0"002309 }
2039\protected\def\Rdsh {\Umathchar "3"0"0021B3 }
2040\protected\def\Re {\Umathchar "0"0"00211C }
2041\protected\def\reals {\Umathchar "0"0"00211D }
2042\protected\def\Relbar {\Umathchar "3"0"00003D }
2043\protected\def\relbar {\Umathchar "3"0"002212 }
2044\protected\def\restriction {\Umathchar "3"0"0021BE }
2045\protected\def\rfloor {\Udelimiter "5"0"00230B }
2046\protected\def\rgroup {\Udelimiter "5"0"0027EF }
2047\protected\def\Rho {\Umathchar "0"0"0003A1 }
2048\protected\def\rho {\Umathchar "0"0"0003C1 }
2049\protected\def\rhook {\Umathchar "3"0"0FE323 }
2050\protected\def\rhooknearrow {\Umathchar "3"0"002924 }
2051\protected\def\rhookswarrow {\Umathchar "3"0"002926 }
2052\protected\def\rightangle {\Umathchar "0"0"00221F }
2053\protected\def\rightarrow {\Umathchar "3"0"002192 }
2054\protected\def\Rightarrow {\Umathchar "3"0"0021D2 }
2055\protected\def\rightarrowbar {\Umathchar "3"0"0021E5 }
2056\protected\def\rightarrowtail {\Umathchar "3"0"0021A3 }
2057\protected\def\rightarrowtriangle {\Umathchar "3"0"0021FE }
2058\protected\def\rightdasharrow {\Umathchar "3"0"0021E2 }
2059\protected\def\rightharpoondown {\Umathchar "3"0"0021C1 }
2060\protected\def\rightharpoonup {\Umathchar "3"0"0021C0 }
2061\protected\def\rightleftarrows {\Umathchar "3"0"0021C4 }
2062\protected\def\rightleftharpoons {\Umathchar "3"0"0021CC }
2063\protected\def\rightrightarrows {\Umathchar "3"0"0021C9 }
2064\protected\def\rightsquigarrow {\Umathchar "3"0"0021DD }
2065\protected\def\rightthreearrows {\Umathchar "3"0"0021F6 }
2066\protected\def\rightthreetimes {\Umathchar "2"0"0022CC }
2067\protected\def\rightwavearrow {\Umathchar "3"0"00219D }
2068\protected\def\rightwhitearrow {\Umathchar "0"0"0021E8 }
2069\protected\def\risingdotseq {\Umathchar "3"0"002253 }
2070\protected\def\rmoustache {\Udelimiter "5"0"0023B1 }
2071\protected\def\rneq {\Umathchar "3"0"002A88 }
2072\protected\def\rparent {\Udelimiter "5"0"000029 }
2073\protected\def\rrangle {\Udelimiter "5"0"0027EB }
2074\protected\def\rrbracket {\Udelimiter "5"0"0027E7 }
2075\protected\def\Rrightarrow {\Umathchar "3"0"0021DB }
2076\protected\def\Rsh {\Umathchar "3"0"0021B1 }
2077\protected\def\rtimes {\Umathchar "2"0"0022CA }
2078\protected\def\rvert {\Udelimiter "5"0"00007C }
2079\protected\def\rVert {\Udelimiter "5"0"002016 }
2080\protected\def\S {\Umathchar "0"0"0000A7 }
2081\protected\def\searrow {\Umathchar "3"0"002198 }
2082\protected\def\Searrow {\Umathchar "3"0"0021D8 }
2083\protected\def\setminus {\Umathchar "2"0"002216 }
2084\protected\def\sharp {\Umathchar "0"0"00266F }
2085\protected\def\Sigma {\Umathchar "0"0"0003A3 }
2086\protected\def\sigma {\Umathchar "0"0"0003C3 }
2087\protected\def\sim {\Umathchar "3"0"00223C }
2088\protected\def\simeq {\Umathchar "3"0"002243 }
2089\protected\def\slash {\Umathchar "0"0"002044 }
2090\protected\def\smile {\Umathchar "3"0"002323 }
2091\protected\def\solidus {\Udelimiter "5"0"002044 }
2092\protected\def\spadesuit {\Umathchar "0"0"002660 }
2093\protected\def\sphericalangle {\Umathchar "0"0"002222 }
2094\protected\def\sqcap {\Umathchar "2"0"002293 }
2095\protected\def\sqcup {\Umathchar "2"0"002294 }
2096\protected\def\sqsubset {\Umathchar "3"0"00228F }
2097\protected\def\sqsubseteq {\Umathchar "2"0"002291 }
2098\protected\def\sqsubsetneq {\Umathchar "3"0"0022E4 }
2099\protected\def\sqsupset {\Umathchar "3"0"002290 }
2100\protected\def\sqsupseteq {\Umathchar "2"0"002292 }
2101\protected\def\sqsupsetneq {\Umathchar "3"0"0022E5 }
2102\protected\def\square {\Umathchar "0"0"0025A1 }
2103\protected\def\squaredots {\Umathchar "3"0"002237 }
2104\protected\def\star {\Umathchar "2"0"0022C6 }
2105\protected\def\stareq {\Umathchar "3"0"00225B }
2106\protected\def\subset {\Umathchar "3"0"002282 }
2107\protected\def\Subset {\Umathchar "3"0"0022D0 }
2108\protected\def\subseteq {\Umathchar "3"0"002286 }
2109\protected\def\subseteqq {\Umathchar "3"0"002AC5 }
2110\protected\def\subsetneq {\Umathchar "3"0"00228A }
2111\protected\def\subsetneqq {\Umathchar "3"0"002ACB }
2112\protected\def\succ {\Umathchar "3"0"00227B }
2113\protected\def\succapprox {\Umathchar "3"0"002AB8 }
2114\protected\def\succcurlyeq {\Umathchar "3"0"00227D }
2115\protected\def\succeq {\Umathchar "3"0"002AB0 }
2116\protected\def\succeqq {\Umathchar "3"0"002AB4 }
2117\protected\def\succnapprox {\Umathchar "3"0"002ABA }
2118\protected\def\succneq {\Umathchar "3"0"002AB2 }
2119\protected\def\succneqq {\Umathchar "3"0"002AB6 }
2120\protected\def\succnsim {\Umathchar "3"0"0022E9 }
2121\protected\def\succsim {\Umathchar "3"0"00227F }
2122\protected\def\sum {\Umathchar "1"0"002211 }
2123\protected\def\supset {\Umathchar "3"0"002283 }
2124\protected\def\Supset {\Umathchar "3"0"0022D1 }
2125\protected\def\supseteq {\Umathchar "3"0"002287 }
2126\protected\def\supseteqq {\Umathchar "3"0"002AC6 }
2127\protected\def\supsetneq {\Umathchar "3"0"00228B }
2128\protected\def\supsetneqq {\Umathchar "3"0"002ACC }
2129\protected\def\surd {\Umathchar "2"0"00221A }
2130\protected\def\swarrow {\Umathchar "3"0"002199 }
2131\protected\def\Swarrow {\Umathchar "3"0"0021D9 }
2132\protected\def\Tau {\Umathchar "0"0"0003A4 }
2133\protected\def\tau {\Umathchar "0"0"0003C4 }
2134\protected\def\therefore {\Umathchar "3"0"002234 }
2135\protected\def\Theta {\Umathchar "0"0"000398 }
2136\protected\def\theta {\Umathchar "0"0"0003B8 }
2137\protected\def\tilde {\Umathaccent"0"0"0002DC }
2138\protected\def\times {\Umathchar "2"0"0000D7 }
2139\protected\def\to {\Umathchar "3"0"002192 }
2140\protected\def\top {\Umathchar "0"0"0022A4 }
2141\protected\def\triangle {\Umathchar "0"0"0025B3 }
2142\protected\def\triangledown {\Umathchar "2"0"0025BD }
2143\protected\def\triangleleft {\Umathchar "2"0"0025C1 }
2144\protected\def\triangleq {\Umathchar "3"0"00225C }
2145\protected\def\triangleright {\Umathchar "2"0"0025B7 }
2146\protected\def\tripleprime {\Umathchar "0"0"002034 }
2147\protected\def\turnediota {\Umathchar "0"0"002129 }
2148\protected\def\twoheaddownarrow {\Umathchar "3"0"0021A1 }
2149\protected\def\twoheadleftarrow {\Umathchar "3"0"00219E }
2150\protected\def\twoheadrightarrow {\Umathchar "3"0"0021A0 }
2151\protected\def\twoheadrightarrowtail {\Umathchar "3"0"002916 }
2152\protected\def\twoheaduparrow {\Umathchar "3"0"00219F }
2153\protected\def\udots {\Umathchar "0"0"0022F0 }
2154\protected\def\ulcorner {\Udelimiter "4"0"00231C }
2155\protected\def\underbar {\Umathaccent bottom "0"0"00203E }
2156\protected\def\underbrace {\Umathaccent bottom "0"0"0023DF }
2157\protected\def\underbracket {\Umathaccent bottom "0"0"0023B5 }
2158\protected\def\underparent {\Umathaccent bottom "0"0"0023DD }
2159\protected\def\upand {\Umathchar "2"0"00214B }
2160\protected\def\uparrow {\Umathchar "3"0"002191 }
2161\protected\def\Uparrow {\Umathchar "3"0"0021D1 }
2162\protected\def\updasharrow {\Umathchar "3"0"0021E1 }
2163\protected\def\updownarrow {\Umathchar "3"0"002195 }
2164\protected\def\Updownarrow {\Umathchar "3"0"0021D5 }
2165\protected\def\updownarrowbar {\Umathchar "0"0"0021A8 }
2166\protected\def\updownarrows {\Umathchar "3"0"0021C5 }
2167\protected\def\upharpoonleft {\Umathchar "3"0"0021BF }
2168\protected\def\upharpoonright {\Umathchar "3"0"0021BE }
2169\protected\def\uplus {\Umathchar "2"0"00228E }
2170\protected\def\Upsilon {\Umathchar "0"0"0003A5 }
2171\protected\def\upsilon {\Umathchar "0"0"0003C5 }
2172\protected\def\upuparrows {\Umathchar "3"0"0021C8 }
2173\protected\def\upwhitearrow {\Umathchar "0"0"0021E7 }
2174\protected\def\urcorner {\Udelimiter "5"0"00231D }
2175\protected\def\Uuparrow {\Umathchar "3"0"00290A }
2176\protected\def\varepsilon {\Umathchar "0"0"0003B5 }
2177\protected\def\varkappa {\Umathchar "0"0"0003F0 }
2178\protected\def\varkappa {\Umathchar "0"0"0003F0 }
2179\protected\def\varnothing {\Umathchar "0"0"002300 }
2180\protected\def\varphi {\Umathchar "0"0"0003C6 }
2181\protected\def\varpi {\Umathchar "0"0"0003D6 }
2182\protected\def\varrho {\Umathchar "0"0"01D71A }
2183\protected\def\varsigma {\Umathchar "0"0"0003C2 }
2184\protected\def\vartheta {\Umathchar "0"0"01D717 }
2185\protected\def\varTheta {\Umathchar "0"0"0003D1 }
2186\protected\def\vdash {\Umathchar "3"0"0022A2 }
2187\protected\def\vDash {\Umathchar "3"0"0022A8 }
2188\protected\def\Vdash {\Umathchar "3"0"0022A9 }
2189\protected\def\VDash {\Umathchar "3"0"0022AB }
2190\protected\def\vdots {\Umathchar "0"0"0022EE }
2191\protected\def\vec {\Umathaccent"0"0"0020D7 }
2192\protected\def\vee {\Umathchar "2"0"002228 }
2193\protected\def\veebar {\Umathchar "2"0"0022BB }
2194\protected\def\veeeq {\Umathchar "3"0"00225A }
2195\protected\def\vert {\Udelimiter "0"0"00007C }
2196\protected\def\Vert {\Udelimiter "0"0"002016 }
2197\protected\def\Vvdash {\Umathchar "3"0"0022AA }
2198\protected\def\wedge {\Umathchar "2"0"002227 }
2199\protected\def\wedgeeq {\Umathchar "3"0"002259 }
2200\protected\def\whitearrowupfrombar {\Umathchar "0"0"0021EB }
2201\protected\def\widehat {\Umathaccent"0"0"000302 }
2202\protected\def\widetilde {\Umathaccent"0"0"000303 }
2203\protected\def\wp {\Umathchar "0"0"002118 }
2204\protected\def\wr {\Umathchar "2"0"002240 }
2205\protected\def\Xi {\Umathchar "0"0"00039E }
2206\protected\def\xi {\Umathchar "0"0"0003BE }
2207\protected\def\yen {\Umathchar "0"0"0000A5 }
2208\protected\def\Zeta {\Umathchar "0"0"000396 }
2209\protected\def\zeta {\Umathchar "0"0"0003B6 }
2210
2211
2212
2213
2214\protected\def\alpha {\Umathchar "0"0"01D6FC }
2215\protected\def\beta {\Umathchar "0"0"01D6FD }
2216\protected\def\chi {\Umathchar "0"0"01D712 }
2217\protected\def\delta {\Umathchar "0"0"01D6FF }
2218\protected\def\digamma {\Umathchar "0"0"0003DC }
2219\protected\def\epsilon {\Umathchar "0"0"01D716 }
2220\protected\def\eta {\Umathchar "0"0"01D702 }
2221\protected\def\gamma {\Umathchar "0"0"01D6FE }
2222\protected\def\iota {\Umathchar "0"0"01D704 }
2223\protected\def\kappa {\Umathchar "0"0"01D705 }
2224\protected\def\lambda {\Umathchar "0"0"01D706 }
2225\protected\def\mu {\Umathchar "0"0"01D707 }
2226\protected\def\nu {\Umathchar "0"0"01D708 }
2227\protected\def\omega {\Umathchar "0"0"01D714 }
2228\protected\def\omicron {\Umathchar "0"0"01D70A }
2229\protected\def\phi {\Umathchar "0"0"01D719 }
2230\protected\def\pi {\Umathchar "0"0"01D70B }
2231\protected\def\psi {\Umathchar "0"0"01D713 }
2232\protected\def\rho {\Umathchar "0"0"01D70C }
2233\protected\def\sigma {\Umathchar "0"0"01D70E }
2234\protected\def\tau {\Umathchar "0"0"01D70F }
2235\protected\def\theta {\Umathchar "0"0"01D703 }
2236\protected\def\upsilon {\Umathchar "0"0"01D710 }
2237\protected\def\varepsilon {\Umathchar "0"0"01D700 }
2238\protected\def\varkappa {\Umathchar "0"0"01D718 }
2239\protected\def\varphi {\Umathchar "0"0"01D711 }
2240\protected\def\varpi {\Umathchar "0"0"01D71B }
2241\protected\def\varrho {\Umathchar "0"0"01D71A }
2242\protected\def\varsigma {\Umathchar "0"0"01D70D }
2243\protected\def\vartheta {\Umathchar "0"0"01D717 }
2244\protected\def\xi {\Umathchar "0"0"01D709 }
2245\protected\def\zeta {\Umathchar "0"0"01D701 }
2246
2247\protected\def\varTheta {\Umathchar "0"0"0003F4 }
2248
2249
2250
2251\protected\def\sqrt {\Uroot "0 "221A{}}
2252\protected\def\root#1\of{\Uroot "0 "221A{#1}}
2253
2254
2255
2256
2257\chardef\% = "25
2258\chardef\& = "26
2259\chardef\# = "23
2260\chardef\$ = "24
2261\chardef\_ = "5F
2262
2263\let\ss ß
2264\let\ae æ
2265\let\oe œ
2266\let\o ø
2267\let\AE Æ
2268\let\OE Œ
2269\let\O Ø
2270\let\i ı
2271\let\j ȷ
2272\let\aa å
2273\let\l ł
2274\let\L Ł
2275\let\AA Å
2276\let\copyright ©
2277\let\S §
2278\let\P ¶
2279\let\dag †
2280\let\ddag ‡
2281\let\pounds £
2282
2283
2284
2285\protected\def\`#1{#10300}
2286\protected\def\'#1{#10301}
2287\protected\def\^#1{#10302}
2288\protected\def\~#1{#10303}
2289\protected\def\=#1{#10304}
2290\protected\def\u#1{#10306}
2291\protected\def\.#1{#10307}
2292\protected\def\"#1{#10308}
2293\protected\def\r#1{#1030a}
2294\protected\def\H#1{#1030b}
2295\protected\def\v#1{#1030c}
2296\protected\def\d#1{#10323}
2297\protected\def\c#1{#10327}
2298\protected\def\k#1{#10328}
2299\protected\def\b#1{#10331}
2300
2301\protected\def\*{\discretionary{\thinspace\the\textfont0\char"00D7}{}{}}
2302
2303\protected\def\t#1{
2304
2305 \begingroup
2306 \setbox0\hbox{#1}
2307 \setbox2\hbox\bgroup
2308 \iffontchar\font"0361\relax
2309 \char"0361\relax
2310 \else
2311 \iffontchar\font"2040\relax\else
2312 \the\textfont0
2313 \fi
2314 \char"2040
2315 \fi
2316 \egroup
2317 \dimen0\wd\ifdim\wd0>\wd2 0\else2\fi
2318 \dimen2\dimexpr\ht2\ht0.45ex\relax
2319 \hbox to \dimen0\bgroup
2320 \hbox to \dimen0{\hss\box0\hss}
2321 \hskip\dimen0
2322 \hbox to \dimen0{\hss\raise\dimen2\box2\hss}
2323 \egroup
2324 \endgroup}
2325
2326
2327
2328
2329
2330
2331
2332
2333
2334
2335
2336
2337
2338
2339
2340
2341
2342
2343\ifdefined\directlua \else
2344
2345 \catcode@=11
2346
2347 \protected\def\sqrt{\Uradical "0 "221A }
2348
2349 \protected\def\root#1\of
2350 {\setbox\rootbox\hbox\bgroup
2351 $\m@th\scriptscriptstyle{#1}$
2352 \egroup
2353 \mathpalette\r@@t}
2354
2355 \catcode@=12
2356
2357\fi
2358
2359\endinput
2360 |