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Updating gen_latex_symbols.py
Brian E. Granger -
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@@ -1,1293 +1,1297 b''
1 1 # encoding: utf-8
2 2
3 # DO NOT EDIT THIS FILE BY HAND.
4
5 # To update this file, run the script /tools/gen_latex_symbols.py using Python 3
6
3 7 # This file is autogenerated from the file:
4 8 # https://raw.githubusercontent.com/JuliaLang/julia/master/base/latex_symbols.jl
5 9 # This original list is filtered to remove any unicode characters that are not valid
6 10 # Python identifiers.
7 11
8 12 latex_symbols = {
9 13
10 14 "\\^a" : "ᵃ",
11 15 "\\^b" : "ᵇ",
12 16 "\\^c" : "ᶜ",
13 17 "\\^d" : "ᵈ",
14 18 "\\^e" : "ᵉ",
15 19 "\\^f" : "ᶠ",
16 20 "\\^g" : "ᵍ",
17 21 "\\^h" : "ʰ",
18 22 "\\^i" : "ⁱ",
19 23 "\\^j" : "ʲ",
20 24 "\\^k" : "ᵏ",
21 25 "\\^l" : "ˡ",
22 26 "\\^m" : "ᵐ",
23 27 "\\^n" : "ⁿ",
24 28 "\\^o" : "ᵒ",
25 29 "\\^p" : "ᵖ",
26 30 "\\^r" : "ʳ",
27 31 "\\^s" : "ˢ",
28 32 "\\^t" : "ᵗ",
29 33 "\\^u" : "ᵘ",
30 34 "\\^v" : "ᵛ",
31 35 "\\^w" : "ʷ",
32 36 "\\^x" : "ˣ",
33 37 "\\^y" : "ʸ",
34 38 "\\^z" : "ᶻ",
35 39 "\\^A" : "ᴬ",
36 40 "\\^B" : "ᴮ",
37 41 "\\^D" : "ᴰ",
38 42 "\\^E" : "ᴱ",
39 43 "\\^G" : "ᴳ",
40 44 "\\^H" : "ᴴ",
41 45 "\\^I" : "ᴵ",
42 46 "\\^J" : "ᴶ",
43 47 "\\^K" : "ᴷ",
44 48 "\\^L" : "ᴸ",
45 49 "\\^M" : "ᴹ",
46 50 "\\^N" : "ᴺ",
47 51 "\\^O" : "ᴼ",
48 52 "\\^P" : "ᴾ",
49 53 "\\^R" : "ᴿ",
50 54 "\\^T" : "ᵀ",
51 55 "\\^U" : "ᵁ",
52 56 "\\^V" : "ⱽ",
53 57 "\\^W" : "ᵂ",
54 58 "\\^alpha" : "ᵅ",
55 59 "\\^beta" : "ᵝ",
56 60 "\\^gamma" : "ᵞ",
57 61 "\\^delta" : "ᵟ",
58 62 "\\^epsilon" : "ᵋ",
59 63 "\\^theta" : "ᶿ",
60 64 "\\^iota" : "ᶥ",
61 65 "\\^phi" : "ᵠ",
62 66 "\\^chi" : "ᵡ",
63 67 "\\^Phi" : "ᶲ",
64 68 "\\_a" : "ₐ",
65 69 "\\_e" : "ₑ",
66 70 "\\_h" : "ₕ",
67 71 "\\_i" : "ᵢ",
68 72 "\\_j" : "ⱼ",
69 73 "\\_k" : "ₖ",
70 74 "\\_l" : "ₗ",
71 75 "\\_m" : "ₘ",
72 76 "\\_n" : "ₙ",
73 77 "\\_o" : "ₒ",
74 78 "\\_p" : "ₚ",
75 79 "\\_r" : "ᵣ",
76 80 "\\_s" : "ₛ",
77 81 "\\_t" : "ₜ",
78 82 "\\_u" : "ᵤ",
79 83 "\\_v" : "ᵥ",
80 84 "\\_x" : "ₓ",
81 85 "\\_schwa" : "ₔ",
82 86 "\\_beta" : "ᵦ",
83 87 "\\_gamma" : "ᵧ",
84 88 "\\_rho" : "ᵨ",
85 89 "\\_phi" : "ᵩ",
86 90 "\\_chi" : "ᵪ",
87 91 "\\hbar" : "ħ",
88 92 "\\sout" : "̶",
89 93 "\\textordfeminine" : "ª",
90 94 "\\cdotp" : "·",
91 95 "\\textordmasculine" : "º",
92 96 "\\AA" : "Å",
93 97 "\\AE" : "Æ",
94 98 "\\DH" : "Ð",
95 99 "\\O" : "Ø",
96 100 "\\TH" : "Þ",
97 101 "\\ss" : "ß",
98 102 "\\aa" : "å",
99 103 "\\ae" : "æ",
100 104 "\\eth" : "ð",
101 105 "\\o" : "ø",
102 106 "\\th" : "þ",
103 107 "\\DJ" : "Đ",
104 108 "\\dj" : "đ",
105 109 "\\Elzxh" : "ħ",
106 110 "\\imath" : "ı",
107 111 "\\L" : "Ł",
108 112 "\\l" : "ł",
109 113 "\\NG" : "Ŋ",
110 114 "\\ng" : "ŋ",
111 115 "\\OE" : "Œ",
112 116 "\\oe" : "œ",
113 117 "\\texthvlig" : "ƕ",
114 118 "\\textnrleg" : "ƞ",
115 119 "\\textdoublepipe" : "ǂ",
116 120 "\\Elztrna" : "ɐ",
117 121 "\\Elztrnsa" : "ɒ",
118 122 "\\Elzopeno" : "ɔ",
119 123 "\\Elzrtld" : "ɖ",
120 124 "\\Elzschwa" : "ə",
121 125 "\\varepsilon" : "ɛ",
122 126 "\\Elzpgamma" : "ɣ",
123 127 "\\Elzpbgam" : "ɤ",
124 128 "\\Elztrnh" : "ɥ",
125 129 "\\Elzbtdl" : "ɬ",
126 130 "\\Elzrtll" : "ɭ",
127 131 "\\Elztrnm" : "ɯ",
128 132 "\\Elztrnmlr" : "ɰ",
129 133 "\\Elzltlmr" : "ɱ",
130 134 "\\Elzltln" : "ɲ",
131 135 "\\Elzrtln" : "ɳ",
132 136 "\\Elzclomeg" : "ɷ",
133 137 "\\textphi" : "ɸ",
134 138 "\\Elztrnr" : "ɹ",
135 139 "\\Elztrnrl" : "ɺ",
136 140 "\\Elzrttrnr" : "ɻ",
137 141 "\\Elzrl" : "ɼ",
138 142 "\\Elzrtlr" : "ɽ",
139 143 "\\Elzfhr" : "ɾ",
140 144 "\\Elzrtls" : "ʂ",
141 145 "\\Elzesh" : "ʃ",
142 146 "\\Elztrnt" : "ʇ",
143 147 "\\Elzrtlt" : "ʈ",
144 148 "\\Elzpupsil" : "ʊ",
145 149 "\\Elzpscrv" : "ʋ",
146 150 "\\Elzinvv" : "ʌ",
147 151 "\\Elzinvw" : "ʍ",
148 152 "\\Elztrny" : "ʎ",
149 153 "\\Elzrtlz" : "ʐ",
150 154 "\\Elzyogh" : "ʒ",
151 155 "\\Elzglst" : "ʔ",
152 156 "\\Elzreglst" : "ʕ",
153 157 "\\Elzinglst" : "ʖ",
154 158 "\\textturnk" : "ʞ",
155 159 "\\Elzdyogh" : "ʤ",
156 160 "\\Elztesh" : "ʧ",
157 161 "\\rasp" : "ʼ",
158 162 "\\textasciicaron" : "ˇ",
159 163 "\\Elzverts" : "ˈ",
160 164 "\\Elzverti" : "ˌ",
161 165 "\\Elzlmrk" : "ː",
162 166 "\\Elzhlmrk" : "ˑ",
163 167 "\\grave" : "̀",
164 168 "\\acute" : "́",
165 169 "\\hat" : "̂",
166 170 "\\tilde" : "̃",
167 171 "\\bar" : "̄",
168 172 "\\breve" : "̆",
169 173 "\\dot" : "̇",
170 174 "\\ddot" : "̈",
171 175 "\\ocirc" : "̊",
172 176 "\\H" : "̋",
173 177 "\\check" : "̌",
174 178 "\\Elzpalh" : "̡",
175 179 "\\Elzrh" : "̢",
176 180 "\\c" : "̧",
177 181 "\\k" : "̨",
178 182 "\\Elzsbbrg" : "̪",
179 183 "\\Elzxl" : "̵",
180 184 "\\Elzbar" : "̶",
181 185 "\\Alpha" : "Α",
182 186 "\\Beta" : "Β",
183 187 "\\Gamma" : "Γ",
184 188 "\\Delta" : "Δ",
185 189 "\\Epsilon" : "Ε",
186 190 "\\Zeta" : "Ζ",
187 191 "\\Eta" : "Η",
188 192 "\\Theta" : "Θ",
189 193 "\\Iota" : "Ι",
190 194 "\\Kappa" : "Κ",
191 195 "\\Lambda" : "Λ",
192 196 "\\Xi" : "Ξ",
193 197 "\\Pi" : "Π",
194 198 "\\Rho" : "Ρ",
195 199 "\\Sigma" : "Σ",
196 200 "\\Tau" : "Τ",
197 201 "\\Upsilon" : "Υ",
198 202 "\\Phi" : "Φ",
199 203 "\\Chi" : "Χ",
200 204 "\\Psi" : "Ψ",
201 205 "\\Omega" : "Ω",
202 206 "\\alpha" : "α",
203 207 "\\beta" : "β",
204 208 "\\gamma" : "γ",
205 209 "\\delta" : "δ",
206 210 "\\zeta" : "ζ",
207 211 "\\eta" : "η",
208 212 "\\theta" : "θ",
209 213 "\\iota" : "ι",
210 214 "\\kappa" : "κ",
211 215 "\\lambda" : "λ",
212 216 "\\mu" : "μ",
213 217 "\\nu" : "ν",
214 218 "\\xi" : "ξ",
215 219 "\\pi" : "π",
216 220 "\\rho" : "ρ",
217 221 "\\varsigma" : "ς",
218 222 "\\sigma" : "σ",
219 223 "\\tau" : "τ",
220 224 "\\upsilon" : "υ",
221 225 "\\varphi" : "φ",
222 226 "\\chi" : "χ",
223 227 "\\psi" : "ψ",
224 228 "\\omega" : "ω",
225 229 "\\vartheta" : "ϑ",
226 230 "\\phi" : "ϕ",
227 231 "\\varpi" : "ϖ",
228 232 "\\Stigma" : "Ϛ",
229 233 "\\Digamma" : "Ϝ",
230 234 "\\digamma" : "ϝ",
231 235 "\\Koppa" : "Ϟ",
232 236 "\\Sampi" : "Ϡ",
233 237 "\\varkappa" : "ϰ",
234 238 "\\varrho" : "ϱ",
235 239 "\\textTheta" : "ϴ",
236 240 "\\epsilon" : "ϵ",
237 241 "\\dddot" : "⃛",
238 242 "\\ddddot" : "⃜",
239 243 "\\hslash" : "ℏ",
240 244 "\\Im" : "ℑ",
241 245 "\\ell" : "ℓ",
242 246 "\\wp" : "℘",
243 247 "\\Re" : "ℜ",
244 248 "\\aleph" : "ℵ",
245 249 "\\beth" : "ℶ",
246 250 "\\gimel" : "ℷ",
247 251 "\\daleth" : "ℸ",
248 252 "\\BbbPi" : "ℿ",
249 253 "\\Zbar" : "Ƶ",
250 254 "\\overbar" : "̅",
251 255 "\\ovhook" : "̉",
252 256 "\\candra" : "̐",
253 257 "\\oturnedcomma" : "̒",
254 258 "\\ocommatopright" : "̕",
255 259 "\\droang" : "̚",
256 260 "\\wideutilde" : "̰",
257 261 "\\underbar" : "̱",
258 262 "\\not" : "̸",
259 263 "\\upMu" : "Μ",
260 264 "\\upNu" : "Ν",
261 265 "\\upOmicron" : "Ο",
262 266 "\\upepsilon" : "ε",
263 267 "\\upomicron" : "ο",
264 268 "\\upvarbeta" : "ϐ",
265 269 "\\upoldKoppa" : "Ϙ",
266 270 "\\upoldkoppa" : "ϙ",
267 271 "\\upstigma" : "ϛ",
268 272 "\\upkoppa" : "ϟ",
269 273 "\\upsampi" : "ϡ",
270 274 "\\tieconcat" : "⁀",
271 275 "\\leftharpoonaccent" : "⃐",
272 276 "\\rightharpoonaccent" : "⃑",
273 277 "\\vertoverlay" : "⃒",
274 278 "\\overleftarrow" : "⃖",
275 279 "\\vec" : "⃗",
276 280 "\\overleftrightarrow" : "⃡",
277 281 "\\annuity" : "⃧",
278 282 "\\threeunderdot" : "⃨",
279 283 "\\widebridgeabove" : "⃩",
280 284 "\\BbbC" : "ℂ",
281 285 "\\Eulerconst" : "ℇ",
282 286 "\\mscrg" : "ℊ",
283 287 "\\mscrH" : "ℋ",
284 288 "\\mfrakH" : "ℌ",
285 289 "\\BbbH" : "ℍ",
286 290 "\\Planckconst" : "ℎ",
287 291 "\\mscrI" : "ℐ",
288 292 "\\mscrL" : "ℒ",
289 293 "\\BbbN" : "ℕ",
290 294 "\\BbbP" : "ℙ",
291 295 "\\BbbQ" : "ℚ",
292 296 "\\mscrR" : "ℛ",
293 297 "\\BbbR" : "ℝ",
294 298 "\\BbbZ" : "ℤ",
295 299 "\\mfrakZ" : "ℨ",
296 300 "\\Angstrom" : "Å",
297 301 "\\mscrB" : "ℬ",
298 302 "\\mfrakC" : "ℭ",
299 303 "\\mscre" : "ℯ",
300 304 "\\mscrE" : "ℰ",
301 305 "\\mscrF" : "ℱ",
302 306 "\\Finv" : "Ⅎ",
303 307 "\\mscrM" : "ℳ",
304 308 "\\mscro" : "ℴ",
305 309 "\\Bbbgamma" : "ℽ",
306 310 "\\BbbGamma" : "ℾ",
307 311 "\\mitBbbD" : "ⅅ",
308 312 "\\mitBbbd" : "ⅆ",
309 313 "\\mitBbbe" : "ⅇ",
310 314 "\\mitBbbi" : "ⅈ",
311 315 "\\mitBbbj" : "ⅉ",
312 316 "\\mbfA" : "𝐀",
313 317 "\\mbfB" : "𝐁",
314 318 "\\mbfC" : "𝐂",
315 319 "\\mbfD" : "𝐃",
316 320 "\\mbfE" : "𝐄",
317 321 "\\mbfF" : "𝐅",
318 322 "\\mbfG" : "𝐆",
319 323 "\\mbfH" : "𝐇",
320 324 "\\mbfI" : "𝐈",
321 325 "\\mbfJ" : "𝐉",
322 326 "\\mbfK" : "𝐊",
323 327 "\\mbfL" : "𝐋",
324 328 "\\mbfM" : "𝐌",
325 329 "\\mbfN" : "𝐍",
326 330 "\\mbfO" : "𝐎",
327 331 "\\mbfP" : "𝐏",
328 332 "\\mbfQ" : "𝐐",
329 333 "\\mbfR" : "𝐑",
330 334 "\\mbfS" : "𝐒",
331 335 "\\mbfT" : "𝐓",
332 336 "\\mbfU" : "𝐔",
333 337 "\\mbfV" : "𝐕",
334 338 "\\mbfW" : "𝐖",
335 339 "\\mbfX" : "𝐗",
336 340 "\\mbfY" : "𝐘",
337 341 "\\mbfZ" : "𝐙",
338 342 "\\mbfa" : "𝐚",
339 343 "\\mbfb" : "𝐛",
340 344 "\\mbfc" : "𝐜",
341 345 "\\mbfd" : "𝐝",
342 346 "\\mbfe" : "𝐞",
343 347 "\\mbff" : "𝐟",
344 348 "\\mbfg" : "𝐠",
345 349 "\\mbfh" : "𝐡",
346 350 "\\mbfi" : "𝐢",
347 351 "\\mbfj" : "𝐣",
348 352 "\\mbfk" : "𝐤",
349 353 "\\mbfl" : "𝐥",
350 354 "\\mbfm" : "𝐦",
351 355 "\\mbfn" : "𝐧",
352 356 "\\mbfo" : "𝐨",
353 357 "\\mbfp" : "𝐩",
354 358 "\\mbfq" : "𝐪",
355 359 "\\mbfr" : "𝐫",
356 360 "\\mbfs" : "𝐬",
357 361 "\\mbft" : "𝐭",
358 362 "\\mbfu" : "𝐮",
359 363 "\\mbfv" : "𝐯",
360 364 "\\mbfw" : "𝐰",
361 365 "\\mbfx" : "𝐱",
362 366 "\\mbfy" : "𝐲",
363 367 "\\mbfz" : "𝐳",
364 368 "\\mitA" : "𝐴",
365 369 "\\mitB" : "𝐵",
366 370 "\\mitC" : "𝐶",
367 371 "\\mitD" : "𝐷",
368 372 "\\mitE" : "𝐸",
369 373 "\\mitF" : "𝐹",
370 374 "\\mitG" : "𝐺",
371 375 "\\mitH" : "𝐻",
372 376 "\\mitI" : "𝐼",
373 377 "\\mitJ" : "𝐽",
374 378 "\\mitK" : "𝐾",
375 379 "\\mitL" : "𝐿",
376 380 "\\mitM" : "𝑀",
377 381 "\\mitN" : "𝑁",
378 382 "\\mitO" : "𝑂",
379 383 "\\mitP" : "𝑃",
380 384 "\\mitQ" : "𝑄",
381 385 "\\mitR" : "𝑅",
382 386 "\\mitS" : "𝑆",
383 387 "\\mitT" : "𝑇",
384 388 "\\mitU" : "𝑈",
385 389 "\\mitV" : "𝑉",
386 390 "\\mitW" : "𝑊",
387 391 "\\mitX" : "𝑋",
388 392 "\\mitY" : "𝑌",
389 393 "\\mitZ" : "𝑍",
390 394 "\\mita" : "𝑎",
391 395 "\\mitb" : "𝑏",
392 396 "\\mitc" : "𝑐",
393 397 "\\mitd" : "𝑑",
394 398 "\\mite" : "𝑒",
395 399 "\\mitf" : "𝑓",
396 400 "\\mitg" : "𝑔",
397 401 "\\miti" : "𝑖",
398 402 "\\mitj" : "𝑗",
399 403 "\\mitk" : "𝑘",
400 404 "\\mitl" : "𝑙",
401 405 "\\mitm" : "𝑚",
402 406 "\\mitn" : "𝑛",
403 407 "\\mito" : "𝑜",
404 408 "\\mitp" : "𝑝",
405 409 "\\mitq" : "𝑞",
406 410 "\\mitr" : "𝑟",
407 411 "\\mits" : "𝑠",
408 412 "\\mitt" : "𝑡",
409 413 "\\mitu" : "𝑢",
410 414 "\\mitv" : "𝑣",
411 415 "\\mitw" : "𝑤",
412 416 "\\mitx" : "𝑥",
413 417 "\\mity" : "𝑦",
414 418 "\\mitz" : "𝑧",
415 419 "\\mbfitA" : "𝑨",
416 420 "\\mbfitB" : "𝑩",
417 421 "\\mbfitC" : "𝑪",
418 422 "\\mbfitD" : "𝑫",
419 423 "\\mbfitE" : "𝑬",
420 424 "\\mbfitF" : "𝑭",
421 425 "\\mbfitG" : "𝑮",
422 426 "\\mbfitH" : "𝑯",
423 427 "\\mbfitI" : "𝑰",
424 428 "\\mbfitJ" : "𝑱",
425 429 "\\mbfitK" : "𝑲",
426 430 "\\mbfitL" : "𝑳",
427 431 "\\mbfitM" : "𝑴",
428 432 "\\mbfitN" : "𝑵",
429 433 "\\mbfitO" : "𝑶",
430 434 "\\mbfitP" : "𝑷",
431 435 "\\mbfitQ" : "𝑸",
432 436 "\\mbfitR" : "𝑹",
433 437 "\\mbfitS" : "𝑺",
434 438 "\\mbfitT" : "𝑻",
435 439 "\\mbfitU" : "𝑼",
436 440 "\\mbfitV" : "𝑽",
437 441 "\\mbfitW" : "𝑾",
438 442 "\\mbfitX" : "𝑿",
439 443 "\\mbfitY" : "𝒀",
440 444 "\\mbfitZ" : "𝒁",
441 445 "\\mbfita" : "𝒂",
442 446 "\\mbfitb" : "𝒃",
443 447 "\\mbfitc" : "𝒄",
444 448 "\\mbfitd" : "𝒅",
445 449 "\\mbfite" : "𝒆",
446 450 "\\mbfitf" : "𝒇",
447 451 "\\mbfitg" : "𝒈",
448 452 "\\mbfith" : "𝒉",
449 453 "\\mbfiti" : "𝒊",
450 454 "\\mbfitj" : "𝒋",
451 455 "\\mbfitk" : "𝒌",
452 456 "\\mbfitl" : "𝒍",
453 457 "\\mbfitm" : "𝒎",
454 458 "\\mbfitn" : "𝒏",
455 459 "\\mbfito" : "𝒐",
456 460 "\\mbfitp" : "𝒑",
457 461 "\\mbfitq" : "𝒒",
458 462 "\\mbfitr" : "𝒓",
459 463 "\\mbfits" : "𝒔",
460 464 "\\mbfitt" : "𝒕",
461 465 "\\mbfitu" : "𝒖",
462 466 "\\mbfitv" : "𝒗",
463 467 "\\mbfitw" : "𝒘",
464 468 "\\mbfitx" : "𝒙",
465 469 "\\mbfity" : "𝒚",
466 470 "\\mbfitz" : "𝒛",
467 471 "\\mscrA" : "𝒜",
468 472 "\\mscrC" : "𝒞",
469 473 "\\mscrD" : "𝒟",
470 474 "\\mscrG" : "𝒢",
471 475 "\\mscrJ" : "𝒥",
472 476 "\\mscrK" : "𝒦",
473 477 "\\mscrN" : "𝒩",
474 478 "\\mscrO" : "𝒪",
475 479 "\\mscrP" : "𝒫",
476 480 "\\mscrQ" : "𝒬",
477 481 "\\mscrS" : "𝒮",
478 482 "\\mscrT" : "𝒯",
479 483 "\\mscrU" : "𝒰",
480 484 "\\mscrV" : "𝒱",
481 485 "\\mscrW" : "𝒲",
482 486 "\\mscrX" : "𝒳",
483 487 "\\mscrY" : "𝒴",
484 488 "\\mscrZ" : "𝒵",
485 489 "\\mscra" : "𝒶",
486 490 "\\mscrb" : "𝒷",
487 491 "\\mscrc" : "𝒸",
488 492 "\\mscrd" : "𝒹",
489 493 "\\mscrf" : "𝒻",
490 494 "\\mscrh" : "𝒽",
491 495 "\\mscri" : "𝒾",
492 496 "\\mscrj" : "𝒿",
493 497 "\\mscrk" : "𝓀",
494 498 "\\mscrm" : "𝓂",
495 499 "\\mscrn" : "𝓃",
496 500 "\\mscrp" : "𝓅",
497 501 "\\mscrq" : "𝓆",
498 502 "\\mscrr" : "𝓇",
499 503 "\\mscrs" : "𝓈",
500 504 "\\mscrt" : "𝓉",
501 505 "\\mscru" : "𝓊",
502 506 "\\mscrv" : "𝓋",
503 507 "\\mscrw" : "𝓌",
504 508 "\\mscrx" : "𝓍",
505 509 "\\mscry" : "𝓎",
506 510 "\\mscrz" : "𝓏",
507 511 "\\mbfscrA" : "𝓐",
508 512 "\\mbfscrB" : "𝓑",
509 513 "\\mbfscrC" : "𝓒",
510 514 "\\mbfscrD" : "𝓓",
511 515 "\\mbfscrE" : "𝓔",
512 516 "\\mbfscrF" : "𝓕",
513 517 "\\mbfscrG" : "𝓖",
514 518 "\\mbfscrH" : "𝓗",
515 519 "\\mbfscrI" : "𝓘",
516 520 "\\mbfscrJ" : "𝓙",
517 521 "\\mbfscrK" : "𝓚",
518 522 "\\mbfscrL" : "𝓛",
519 523 "\\mbfscrM" : "𝓜",
520 524 "\\mbfscrN" : "𝓝",
521 525 "\\mbfscrO" : "𝓞",
522 526 "\\mbfscrP" : "𝓟",
523 527 "\\mbfscrQ" : "𝓠",
524 528 "\\mbfscrR" : "𝓡",
525 529 "\\mbfscrS" : "𝓢",
526 530 "\\mbfscrT" : "𝓣",
527 531 "\\mbfscrU" : "𝓤",
528 532 "\\mbfscrV" : "𝓥",
529 533 "\\mbfscrW" : "𝓦",
530 534 "\\mbfscrX" : "𝓧",
531 535 "\\mbfscrY" : "𝓨",
532 536 "\\mbfscrZ" : "𝓩",
533 537 "\\mbfscra" : "𝓪",
534 538 "\\mbfscrb" : "𝓫",
535 539 "\\mbfscrc" : "𝓬",
536 540 "\\mbfscrd" : "𝓭",
537 541 "\\mbfscre" : "𝓮",
538 542 "\\mbfscrf" : "𝓯",
539 543 "\\mbfscrg" : "𝓰",
540 544 "\\mbfscrh" : "𝓱",
541 545 "\\mbfscri" : "𝓲",
542 546 "\\mbfscrj" : "𝓳",
543 547 "\\mbfscrk" : "𝓴",
544 548 "\\mbfscrl" : "𝓵",
545 549 "\\mbfscrm" : "𝓶",
546 550 "\\mbfscrn" : "𝓷",
547 551 "\\mbfscro" : "𝓸",
548 552 "\\mbfscrp" : "𝓹",
549 553 "\\mbfscrq" : "𝓺",
550 554 "\\mbfscrr" : "𝓻",
551 555 "\\mbfscrs" : "𝓼",
552 556 "\\mbfscrt" : "𝓽",
553 557 "\\mbfscru" : "𝓾",
554 558 "\\mbfscrv" : "𝓿",
555 559 "\\mbfscrw" : "𝔀",
556 560 "\\mbfscrx" : "𝔁",
557 561 "\\mbfscry" : "𝔂",
558 562 "\\mbfscrz" : "𝔃",
559 563 "\\mfrakA" : "𝔄",
560 564 "\\mfrakB" : "𝔅",
561 565 "\\mfrakD" : "𝔇",
562 566 "\\mfrakE" : "𝔈",
563 567 "\\mfrakF" : "𝔉",
564 568 "\\mfrakG" : "𝔊",
565 569 "\\mfrakJ" : "𝔍",
566 570 "\\mfrakK" : "𝔎",
567 571 "\\mfrakL" : "𝔏",
568 572 "\\mfrakM" : "𝔐",
569 573 "\\mfrakN" : "𝔑",
570 574 "\\mfrakO" : "𝔒",
571 575 "\\mfrakP" : "𝔓",
572 576 "\\mfrakQ" : "𝔔",
573 577 "\\mfrakS" : "𝔖",
574 578 "\\mfrakT" : "𝔗",
575 579 "\\mfrakU" : "𝔘",
576 580 "\\mfrakV" : "𝔙",
577 581 "\\mfrakW" : "𝔚",
578 582 "\\mfrakX" : "𝔛",
579 583 "\\mfrakY" : "𝔜",
580 584 "\\mfraka" : "𝔞",
581 585 "\\mfrakb" : "𝔟",
582 586 "\\mfrakc" : "𝔠",
583 587 "\\mfrakd" : "𝔡",
584 588 "\\mfrake" : "𝔢",
585 589 "\\mfrakf" : "𝔣",
586 590 "\\mfrakg" : "𝔤",
587 591 "\\mfrakh" : "𝔥",
588 592 "\\mfraki" : "𝔦",
589 593 "\\mfrakj" : "𝔧",
590 594 "\\mfrakk" : "𝔨",
591 595 "\\mfrakl" : "𝔩",
592 596 "\\mfrakm" : "𝔪",
593 597 "\\mfrakn" : "𝔫",
594 598 "\\mfrako" : "𝔬",
595 599 "\\mfrakp" : "𝔭",
596 600 "\\mfrakq" : "𝔮",
597 601 "\\mfrakr" : "𝔯",
598 602 "\\mfraks" : "𝔰",
599 603 "\\mfrakt" : "𝔱",
600 604 "\\mfraku" : "𝔲",
601 605 "\\mfrakv" : "𝔳",
602 606 "\\mfrakw" : "𝔴",
603 607 "\\mfrakx" : "𝔵",
604 608 "\\mfraky" : "𝔶",
605 609 "\\mfrakz" : "𝔷",
606 610 "\\BbbA" : "𝔸",
607 611 "\\BbbB" : "𝔹",
608 612 "\\BbbD" : "𝔻",
609 613 "\\BbbE" : "𝔼",
610 614 "\\BbbF" : "𝔽",
611 615 "\\BbbG" : "𝔾",
612 616 "\\BbbI" : "𝕀",
613 617 "\\BbbJ" : "𝕁",
614 618 "\\BbbK" : "𝕂",
615 619 "\\BbbL" : "𝕃",
616 620 "\\BbbM" : "𝕄",
617 621 "\\BbbO" : "𝕆",
618 622 "\\BbbS" : "𝕊",
619 623 "\\BbbT" : "𝕋",
620 624 "\\BbbU" : "𝕌",
621 625 "\\BbbV" : "𝕍",
622 626 "\\BbbW" : "𝕎",
623 627 "\\BbbX" : "𝕏",
624 628 "\\BbbY" : "𝕐",
625 629 "\\Bbba" : "𝕒",
626 630 "\\Bbbb" : "𝕓",
627 631 "\\Bbbc" : "𝕔",
628 632 "\\Bbbd" : "𝕕",
629 633 "\\Bbbe" : "𝕖",
630 634 "\\Bbbf" : "𝕗",
631 635 "\\Bbbg" : "𝕘",
632 636 "\\Bbbh" : "𝕙",
633 637 "\\Bbbi" : "𝕚",
634 638 "\\Bbbj" : "𝕛",
635 639 "\\Bbbk" : "𝕜",
636 640 "\\Bbbl" : "𝕝",
637 641 "\\Bbbm" : "𝕞",
638 642 "\\Bbbn" : "𝕟",
639 643 "\\Bbbo" : "𝕠",
640 644 "\\Bbbp" : "𝕡",
641 645 "\\Bbbq" : "𝕢",
642 646 "\\Bbbr" : "𝕣",
643 647 "\\Bbbs" : "𝕤",
644 648 "\\Bbbt" : "𝕥",
645 649 "\\Bbbu" : "𝕦",
646 650 "\\Bbbv" : "𝕧",
647 651 "\\Bbbw" : "𝕨",
648 652 "\\Bbbx" : "𝕩",
649 653 "\\Bbby" : "𝕪",
650 654 "\\Bbbz" : "𝕫",
651 655 "\\mbffrakA" : "𝕬",
652 656 "\\mbffrakB" : "𝕭",
653 657 "\\mbffrakC" : "𝕮",
654 658 "\\mbffrakD" : "𝕯",
655 659 "\\mbffrakE" : "𝕰",
656 660 "\\mbffrakF" : "𝕱",
657 661 "\\mbffrakG" : "𝕲",
658 662 "\\mbffrakH" : "𝕳",
659 663 "\\mbffrakI" : "𝕴",
660 664 "\\mbffrakJ" : "𝕵",
661 665 "\\mbffrakK" : "𝕶",
662 666 "\\mbffrakL" : "𝕷",
663 667 "\\mbffrakM" : "𝕸",
664 668 "\\mbffrakN" : "𝕹",
665 669 "\\mbffrakO" : "𝕺",
666 670 "\\mbffrakP" : "𝕻",
667 671 "\\mbffrakQ" : "𝕼",
668 672 "\\mbffrakR" : "𝕽",
669 673 "\\mbffrakS" : "𝕾",
670 674 "\\mbffrakT" : "𝕿",
671 675 "\\mbffrakU" : "𝖀",
672 676 "\\mbffrakV" : "𝖁",
673 677 "\\mbffrakW" : "𝖂",
674 678 "\\mbffrakX" : "𝖃",
675 679 "\\mbffrakY" : "𝖄",
676 680 "\\mbffrakZ" : "𝖅",
677 681 "\\mbffraka" : "𝖆",
678 682 "\\mbffrakb" : "𝖇",
679 683 "\\mbffrakc" : "𝖈",
680 684 "\\mbffrakd" : "𝖉",
681 685 "\\mbffrake" : "𝖊",
682 686 "\\mbffrakf" : "𝖋",
683 687 "\\mbffrakg" : "𝖌",
684 688 "\\mbffrakh" : "𝖍",
685 689 "\\mbffraki" : "𝖎",
686 690 "\\mbffrakj" : "𝖏",
687 691 "\\mbffrakk" : "𝖐",
688 692 "\\mbffrakl" : "𝖑",
689 693 "\\mbffrakm" : "𝖒",
690 694 "\\mbffrakn" : "𝖓",
691 695 "\\mbffrako" : "𝖔",
692 696 "\\mbffrakp" : "𝖕",
693 697 "\\mbffrakq" : "𝖖",
694 698 "\\mbffrakr" : "𝖗",
695 699 "\\mbffraks" : "𝖘",
696 700 "\\mbffrakt" : "𝖙",
697 701 "\\mbffraku" : "𝖚",
698 702 "\\mbffrakv" : "𝖛",
699 703 "\\mbffrakw" : "𝖜",
700 704 "\\mbffrakx" : "𝖝",
701 705 "\\mbffraky" : "𝖞",
702 706 "\\mbffrakz" : "𝖟",
703 707 "\\msansA" : "𝖠",
704 708 "\\msansB" : "𝖡",
705 709 "\\msansC" : "𝖢",
706 710 "\\msansD" : "𝖣",
707 711 "\\msansE" : "𝖤",
708 712 "\\msansF" : "𝖥",
709 713 "\\msansG" : "𝖦",
710 714 "\\msansH" : "𝖧",
711 715 "\\msansI" : "𝖨",
712 716 "\\msansJ" : "𝖩",
713 717 "\\msansK" : "𝖪",
714 718 "\\msansL" : "𝖫",
715 719 "\\msansM" : "𝖬",
716 720 "\\msansN" : "𝖭",
717 721 "\\msansO" : "𝖮",
718 722 "\\msansP" : "𝖯",
719 723 "\\msansQ" : "𝖰",
720 724 "\\msansR" : "𝖱",
721 725 "\\msansS" : "𝖲",
722 726 "\\msansT" : "𝖳",
723 727 "\\msansU" : "𝖴",
724 728 "\\msansV" : "𝖵",
725 729 "\\msansW" : "𝖶",
726 730 "\\msansX" : "𝖷",
727 731 "\\msansY" : "𝖸",
728 732 "\\msansZ" : "𝖹",
729 733 "\\msansa" : "𝖺",
730 734 "\\msansb" : "𝖻",
731 735 "\\msansc" : "𝖼",
732 736 "\\msansd" : "𝖽",
733 737 "\\msanse" : "𝖾",
734 738 "\\msansf" : "𝖿",
735 739 "\\msansg" : "𝗀",
736 740 "\\msansh" : "𝗁",
737 741 "\\msansi" : "𝗂",
738 742 "\\msansj" : "𝗃",
739 743 "\\msansk" : "𝗄",
740 744 "\\msansl" : "𝗅",
741 745 "\\msansm" : "𝗆",
742 746 "\\msansn" : "𝗇",
743 747 "\\msanso" : "𝗈",
744 748 "\\msansp" : "𝗉",
745 749 "\\msansq" : "𝗊",
746 750 "\\msansr" : "𝗋",
747 751 "\\msanss" : "𝗌",
748 752 "\\msanst" : "𝗍",
749 753 "\\msansu" : "𝗎",
750 754 "\\msansv" : "𝗏",
751 755 "\\msansw" : "𝗐",
752 756 "\\msansx" : "𝗑",
753 757 "\\msansy" : "𝗒",
754 758 "\\msansz" : "𝗓",
755 759 "\\mbfsansA" : "𝗔",
756 760 "\\mbfsansB" : "𝗕",
757 761 "\\mbfsansC" : "𝗖",
758 762 "\\mbfsansD" : "𝗗",
759 763 "\\mbfsansE" : "𝗘",
760 764 "\\mbfsansF" : "𝗙",
761 765 "\\mbfsansG" : "𝗚",
762 766 "\\mbfsansH" : "𝗛",
763 767 "\\mbfsansI" : "𝗜",
764 768 "\\mbfsansJ" : "𝗝",
765 769 "\\mbfsansK" : "𝗞",
766 770 "\\mbfsansL" : "𝗟",
767 771 "\\mbfsansM" : "𝗠",
768 772 "\\mbfsansN" : "𝗡",
769 773 "\\mbfsansO" : "𝗢",
770 774 "\\mbfsansP" : "𝗣",
771 775 "\\mbfsansQ" : "𝗤",
772 776 "\\mbfsansR" : "𝗥",
773 777 "\\mbfsansS" : "𝗦",
774 778 "\\mbfsansT" : "𝗧",
775 779 "\\mbfsansU" : "𝗨",
776 780 "\\mbfsansV" : "𝗩",
777 781 "\\mbfsansW" : "𝗪",
778 782 "\\mbfsansX" : "𝗫",
779 783 "\\mbfsansY" : "𝗬",
780 784 "\\mbfsansZ" : "𝗭",
781 785 "\\mbfsansa" : "𝗮",
782 786 "\\mbfsansb" : "𝗯",
783 787 "\\mbfsansc" : "𝗰",
784 788 "\\mbfsansd" : "𝗱",
785 789 "\\mbfsanse" : "𝗲",
786 790 "\\mbfsansf" : "𝗳",
787 791 "\\mbfsansg" : "𝗴",
788 792 "\\mbfsansh" : "𝗵",
789 793 "\\mbfsansi" : "𝗶",
790 794 "\\mbfsansj" : "𝗷",
791 795 "\\mbfsansk" : "𝗸",
792 796 "\\mbfsansl" : "𝗹",
793 797 "\\mbfsansm" : "𝗺",
794 798 "\\mbfsansn" : "𝗻",
795 799 "\\mbfsanso" : "𝗼",
796 800 "\\mbfsansp" : "𝗽",
797 801 "\\mbfsansq" : "𝗾",
798 802 "\\mbfsansr" : "𝗿",
799 803 "\\mbfsanss" : "𝘀",
800 804 "\\mbfsanst" : "𝘁",
801 805 "\\mbfsansu" : "𝘂",
802 806 "\\mbfsansv" : "𝘃",
803 807 "\\mbfsansw" : "𝘄",
804 808 "\\mbfsansx" : "𝘅",
805 809 "\\mbfsansy" : "𝘆",
806 810 "\\mbfsansz" : "𝘇",
807 811 "\\mitsansA" : "𝘈",
808 812 "\\mitsansB" : "𝘉",
809 813 "\\mitsansC" : "𝘊",
810 814 "\\mitsansD" : "𝘋",
811 815 "\\mitsansE" : "𝘌",
812 816 "\\mitsansF" : "𝘍",
813 817 "\\mitsansG" : "𝘎",
814 818 "\\mitsansH" : "𝘏",
815 819 "\\mitsansI" : "𝘐",
816 820 "\\mitsansJ" : "𝘑",
817 821 "\\mitsansK" : "𝘒",
818 822 "\\mitsansL" : "𝘓",
819 823 "\\mitsansM" : "𝘔",
820 824 "\\mitsansN" : "𝘕",
821 825 "\\mitsansO" : "𝘖",
822 826 "\\mitsansP" : "𝘗",
823 827 "\\mitsansQ" : "𝘘",
824 828 "\\mitsansR" : "𝘙",
825 829 "\\mitsansS" : "𝘚",
826 830 "\\mitsansT" : "𝘛",
827 831 "\\mitsansU" : "𝘜",
828 832 "\\mitsansV" : "𝘝",
829 833 "\\mitsansW" : "𝘞",
830 834 "\\mitsansX" : "𝘟",
831 835 "\\mitsansY" : "𝘠",
832 836 "\\mitsansZ" : "𝘡",
833 837 "\\mitsansa" : "𝘢",
834 838 "\\mitsansb" : "𝘣",
835 839 "\\mitsansc" : "𝘤",
836 840 "\\mitsansd" : "𝘥",
837 841 "\\mitsanse" : "𝘦",
838 842 "\\mitsansf" : "𝘧",
839 843 "\\mitsansg" : "𝘨",
840 844 "\\mitsansh" : "𝘩",
841 845 "\\mitsansi" : "𝘪",
842 846 "\\mitsansj" : "𝘫",
843 847 "\\mitsansk" : "𝘬",
844 848 "\\mitsansl" : "𝘭",
845 849 "\\mitsansm" : "𝘮",
846 850 "\\mitsansn" : "𝘯",
847 851 "\\mitsanso" : "𝘰",
848 852 "\\mitsansp" : "𝘱",
849 853 "\\mitsansq" : "𝘲",
850 854 "\\mitsansr" : "𝘳",
851 855 "\\mitsanss" : "𝘴",
852 856 "\\mitsanst" : "𝘵",
853 857 "\\mitsansu" : "𝘶",
854 858 "\\mitsansv" : "𝘷",
855 859 "\\mitsansw" : "𝘸",
856 860 "\\mitsansx" : "𝘹",
857 861 "\\mitsansy" : "𝘺",
858 862 "\\mitsansz" : "𝘻",
859 863 "\\mbfitsansA" : "𝘼",
860 864 "\\mbfitsansB" : "𝘽",
861 865 "\\mbfitsansC" : "𝘾",
862 866 "\\mbfitsansD" : "𝘿",
863 867 "\\mbfitsansE" : "𝙀",
864 868 "\\mbfitsansF" : "𝙁",
865 869 "\\mbfitsansG" : "𝙂",
866 870 "\\mbfitsansH" : "𝙃",
867 871 "\\mbfitsansI" : "𝙄",
868 872 "\\mbfitsansJ" : "𝙅",
869 873 "\\mbfitsansK" : "𝙆",
870 874 "\\mbfitsansL" : "𝙇",
871 875 "\\mbfitsansM" : "𝙈",
872 876 "\\mbfitsansN" : "𝙉",
873 877 "\\mbfitsansO" : "𝙊",
874 878 "\\mbfitsansP" : "𝙋",
875 879 "\\mbfitsansQ" : "𝙌",
876 880 "\\mbfitsansR" : "𝙍",
877 881 "\\mbfitsansS" : "𝙎",
878 882 "\\mbfitsansT" : "𝙏",
879 883 "\\mbfitsansU" : "𝙐",
880 884 "\\mbfitsansV" : "𝙑",
881 885 "\\mbfitsansW" : "𝙒",
882 886 "\\mbfitsansX" : "𝙓",
883 887 "\\mbfitsansY" : "𝙔",
884 888 "\\mbfitsansZ" : "𝙕",
885 889 "\\mbfitsansa" : "𝙖",
886 890 "\\mbfitsansb" : "𝙗",
887 891 "\\mbfitsansc" : "𝙘",
888 892 "\\mbfitsansd" : "𝙙",
889 893 "\\mbfitsanse" : "𝙚",
890 894 "\\mbfitsansf" : "𝙛",
891 895 "\\mbfitsansg" : "𝙜",
892 896 "\\mbfitsansh" : "𝙝",
893 897 "\\mbfitsansi" : "𝙞",
894 898 "\\mbfitsansj" : "𝙟",
895 899 "\\mbfitsansk" : "𝙠",
896 900 "\\mbfitsansl" : "𝙡",
897 901 "\\mbfitsansm" : "𝙢",
898 902 "\\mbfitsansn" : "𝙣",
899 903 "\\mbfitsanso" : "𝙤",
900 904 "\\mbfitsansp" : "𝙥",
901 905 "\\mbfitsansq" : "𝙦",
902 906 "\\mbfitsansr" : "𝙧",
903 907 "\\mbfitsanss" : "𝙨",
904 908 "\\mbfitsanst" : "𝙩",
905 909 "\\mbfitsansu" : "𝙪",
906 910 "\\mbfitsansv" : "𝙫",
907 911 "\\mbfitsansw" : "𝙬",
908 912 "\\mbfitsansx" : "𝙭",
909 913 "\\mbfitsansy" : "𝙮",
910 914 "\\mbfitsansz" : "𝙯",
911 915 "\\mttA" : "𝙰",
912 916 "\\mttB" : "𝙱",
913 917 "\\mttC" : "𝙲",
914 918 "\\mttD" : "𝙳",
915 919 "\\mttE" : "𝙴",
916 920 "\\mttF" : "𝙵",
917 921 "\\mttG" : "𝙶",
918 922 "\\mttH" : "𝙷",
919 923 "\\mttI" : "𝙸",
920 924 "\\mttJ" : "𝙹",
921 925 "\\mttK" : "𝙺",
922 926 "\\mttL" : "𝙻",
923 927 "\\mttM" : "𝙼",
924 928 "\\mttN" : "𝙽",
925 929 "\\mttO" : "𝙾",
926 930 "\\mttP" : "𝙿",
927 931 "\\mttQ" : "𝚀",
928 932 "\\mttR" : "𝚁",
929 933 "\\mttS" : "𝚂",
930 934 "\\mttT" : "𝚃",
931 935 "\\mttU" : "𝚄",
932 936 "\\mttV" : "𝚅",
933 937 "\\mttW" : "𝚆",
934 938 "\\mttX" : "𝚇",
935 939 "\\mttY" : "𝚈",
936 940 "\\mttZ" : "𝚉",
937 941 "\\mtta" : "𝚊",
938 942 "\\mttb" : "𝚋",
939 943 "\\mttc" : "𝚌",
940 944 "\\mttd" : "𝚍",
941 945 "\\mtte" : "𝚎",
942 946 "\\mttf" : "𝚏",
943 947 "\\mttg" : "𝚐",
944 948 "\\mtth" : "𝚑",
945 949 "\\mtti" : "𝚒",
946 950 "\\mttj" : "𝚓",
947 951 "\\mttk" : "𝚔",
948 952 "\\mttl" : "𝚕",
949 953 "\\mttm" : "𝚖",
950 954 "\\mttn" : "𝚗",
951 955 "\\mtto" : "𝚘",
952 956 "\\mttp" : "𝚙",
953 957 "\\mttq" : "𝚚",
954 958 "\\mttr" : "𝚛",
955 959 "\\mtts" : "𝚜",
956 960 "\\mttt" : "𝚝",
957 961 "\\mttu" : "𝚞",
958 962 "\\mttv" : "𝚟",
959 963 "\\mttw" : "𝚠",
960 964 "\\mttx" : "𝚡",
961 965 "\\mtty" : "𝚢",
962 966 "\\mttz" : "𝚣",
963 967 "\\mbfAlpha" : "𝚨",
964 968 "\\mbfBeta" : "𝚩",
965 969 "\\mbfGamma" : "𝚪",
966 970 "\\mbfDelta" : "𝚫",
967 971 "\\mbfEpsilon" : "𝚬",
968 972 "\\mbfZeta" : "𝚭",
969 973 "\\mbfEta" : "𝚮",
970 974 "\\mbfTheta" : "𝚯",
971 975 "\\mbfIota" : "𝚰",
972 976 "\\mbfKappa" : "𝚱",
973 977 "\\mbfLambda" : "𝚲",
974 978 "\\mbfMu" : "𝚳",
975 979 "\\mbfNu" : "𝚴",
976 980 "\\mbfXi" : "𝚵",
977 981 "\\mbfOmicron" : "𝚶",
978 982 "\\mbfPi" : "𝚷",
979 983 "\\mbfRho" : "𝚸",
980 984 "\\mbfvarTheta" : "𝚹",
981 985 "\\mbfSigma" : "𝚺",
982 986 "\\mbfTau" : "𝚻",
983 987 "\\mbfUpsilon" : "𝚼",
984 988 "\\mbfPhi" : "𝚽",
985 989 "\\mbfChi" : "𝚾",
986 990 "\\mbfPsi" : "𝚿",
987 991 "\\mbfOmega" : "𝛀",
988 992 "\\mbfalpha" : "𝛂",
989 993 "\\mbfbeta" : "𝛃",
990 994 "\\mbfgamma" : "𝛄",
991 995 "\\mbfdelta" : "𝛅",
992 996 "\\mbfepsilon" : "𝛆",
993 997 "\\mbfzeta" : "𝛇",
994 998 "\\mbfeta" : "𝛈",
995 999 "\\mbftheta" : "𝛉",
996 1000 "\\mbfiota" : "𝛊",
997 1001 "\\mbfkappa" : "𝛋",
998 1002 "\\mbflambda" : "𝛌",
999 1003 "\\mbfmu" : "𝛍",
1000 1004 "\\mbfnu" : "𝛎",
1001 1005 "\\mbfxi" : "𝛏",
1002 1006 "\\mbfomicron" : "𝛐",
1003 1007 "\\mbfpi" : "𝛑",
1004 1008 "\\mbfrho" : "𝛒",
1005 1009 "\\mbfvarsigma" : "𝛓",
1006 1010 "\\mbfsigma" : "𝛔",
1007 1011 "\\mbftau" : "𝛕",
1008 1012 "\\mbfupsilon" : "𝛖",
1009 1013 "\\mbfvarphi" : "𝛗",
1010 1014 "\\mbfchi" : "𝛘",
1011 1015 "\\mbfpsi" : "𝛙",
1012 1016 "\\mbfomega" : "𝛚",
1013 1017 "\\mbfvarepsilon" : "𝛜",
1014 1018 "\\mbfvartheta" : "𝛝",
1015 1019 "\\mbfvarkappa" : "𝛞",
1016 1020 "\\mbfphi" : "𝛟",
1017 1021 "\\mbfvarrho" : "𝛠",
1018 1022 "\\mbfvarpi" : "𝛡",
1019 1023 "\\mitAlpha" : "𝛢",
1020 1024 "\\mitBeta" : "𝛣",
1021 1025 "\\mitGamma" : "𝛤",
1022 1026 "\\mitDelta" : "𝛥",
1023 1027 "\\mitEpsilon" : "𝛦",
1024 1028 "\\mitZeta" : "𝛧",
1025 1029 "\\mitEta" : "𝛨",
1026 1030 "\\mitTheta" : "𝛩",
1027 1031 "\\mitIota" : "𝛪",
1028 1032 "\\mitKappa" : "𝛫",
1029 1033 "\\mitLambda" : "𝛬",
1030 1034 "\\mitMu" : "𝛭",
1031 1035 "\\mitNu" : "𝛮",
1032 1036 "\\mitXi" : "𝛯",
1033 1037 "\\mitOmicron" : "𝛰",
1034 1038 "\\mitPi" : "𝛱",
1035 1039 "\\mitRho" : "𝛲",
1036 1040 "\\mitvarTheta" : "𝛳",
1037 1041 "\\mitSigma" : "𝛴",
1038 1042 "\\mitTau" : "𝛵",
1039 1043 "\\mitUpsilon" : "𝛶",
1040 1044 "\\mitPhi" : "𝛷",
1041 1045 "\\mitChi" : "𝛸",
1042 1046 "\\mitPsi" : "𝛹",
1043 1047 "\\mitOmega" : "𝛺",
1044 1048 "\\mitalpha" : "𝛼",
1045 1049 "\\mitbeta" : "𝛽",
1046 1050 "\\mitgamma" : "𝛾",
1047 1051 "\\mitdelta" : "𝛿",
1048 1052 "\\mitepsilon" : "𝜀",
1049 1053 "\\mitzeta" : "𝜁",
1050 1054 "\\miteta" : "𝜂",
1051 1055 "\\mittheta" : "𝜃",
1052 1056 "\\mitiota" : "𝜄",
1053 1057 "\\mitkappa" : "𝜅",
1054 1058 "\\mitlambda" : "𝜆",
1055 1059 "\\mitmu" : "𝜇",
1056 1060 "\\mitnu" : "𝜈",
1057 1061 "\\mitxi" : "𝜉",
1058 1062 "\\mitomicron" : "𝜊",
1059 1063 "\\mitpi" : "𝜋",
1060 1064 "\\mitrho" : "𝜌",
1061 1065 "\\mitvarsigma" : "𝜍",
1062 1066 "\\mitsigma" : "𝜎",
1063 1067 "\\mittau" : "𝜏",
1064 1068 "\\mitupsilon" : "𝜐",
1065 1069 "\\mitphi" : "𝜑",
1066 1070 "\\mitchi" : "𝜒",
1067 1071 "\\mitpsi" : "𝜓",
1068 1072 "\\mitomega" : "𝜔",
1069 1073 "\\mitvarepsilon" : "𝜖",
1070 1074 "\\mitvartheta" : "𝜗",
1071 1075 "\\mitvarkappa" : "𝜘",
1072 1076 "\\mitvarphi" : "𝜙",
1073 1077 "\\mitvarrho" : "𝜚",
1074 1078 "\\mitvarpi" : "𝜛",
1075 1079 "\\mbfitAlpha" : "𝜜",
1076 1080 "\\mbfitBeta" : "𝜝",
1077 1081 "\\mbfitGamma" : "𝜞",
1078 1082 "\\mbfitDelta" : "𝜟",
1079 1083 "\\mbfitEpsilon" : "𝜠",
1080 1084 "\\mbfitZeta" : "𝜡",
1081 1085 "\\mbfitEta" : "𝜢",
1082 1086 "\\mbfitTheta" : "𝜣",
1083 1087 "\\mbfitIota" : "𝜤",
1084 1088 "\\mbfitKappa" : "𝜥",
1085 1089 "\\mbfitLambda" : "𝜦",
1086 1090 "\\mbfitMu" : "𝜧",
1087 1091 "\\mbfitNu" : "𝜨",
1088 1092 "\\mbfitXi" : "𝜩",
1089 1093 "\\mbfitOmicron" : "𝜪",
1090 1094 "\\mbfitPi" : "𝜫",
1091 1095 "\\mbfitRho" : "𝜬",
1092 1096 "\\mbfitvarTheta" : "𝜭",
1093 1097 "\\mbfitSigma" : "𝜮",
1094 1098 "\\mbfitTau" : "𝜯",
1095 1099 "\\mbfitUpsilon" : "𝜰",
1096 1100 "\\mbfitPhi" : "𝜱",
1097 1101 "\\mbfitChi" : "𝜲",
1098 1102 "\\mbfitPsi" : "𝜳",
1099 1103 "\\mbfitOmega" : "𝜴",
1100 1104 "\\mbfitalpha" : "𝜶",
1101 1105 "\\mbfitbeta" : "𝜷",
1102 1106 "\\mbfitgamma" : "𝜸",
1103 1107 "\\mbfitdelta" : "𝜹",
1104 1108 "\\mbfitepsilon" : "𝜺",
1105 1109 "\\mbfitzeta" : "𝜻",
1106 1110 "\\mbfiteta" : "𝜼",
1107 1111 "\\mbfittheta" : "𝜽",
1108 1112 "\\mbfitiota" : "𝜾",
1109 1113 "\\mbfitkappa" : "𝜿",
1110 1114 "\\mbfitlambda" : "𝝀",
1111 1115 "\\mbfitmu" : "𝝁",
1112 1116 "\\mbfitnu" : "𝝂",
1113 1117 "\\mbfitxi" : "𝝃",
1114 1118 "\\mbfitomicron" : "𝝄",
1115 1119 "\\mbfitpi" : "𝝅",
1116 1120 "\\mbfitrho" : "𝝆",
1117 1121 "\\mbfitvarsigma" : "𝝇",
1118 1122 "\\mbfitsigma" : "𝝈",
1119 1123 "\\mbfittau" : "𝝉",
1120 1124 "\\mbfitupsilon" : "𝝊",
1121 1125 "\\mbfitphi" : "𝝋",
1122 1126 "\\mbfitchi" : "𝝌",
1123 1127 "\\mbfitpsi" : "𝝍",
1124 1128 "\\mbfitomega" : "𝝎",
1125 1129 "\\mbfitvarepsilon" : "𝝐",
1126 1130 "\\mbfitvartheta" : "𝝑",
1127 1131 "\\mbfitvarkappa" : "𝝒",
1128 1132 "\\mbfitvarphi" : "𝝓",
1129 1133 "\\mbfitvarrho" : "𝝔",
1130 1134 "\\mbfitvarpi" : "𝝕",
1131 1135 "\\mbfsansAlpha" : "𝝖",
1132 1136 "\\mbfsansBeta" : "𝝗",
1133 1137 "\\mbfsansGamma" : "𝝘",
1134 1138 "\\mbfsansDelta" : "𝝙",
1135 1139 "\\mbfsansEpsilon" : "𝝚",
1136 1140 "\\mbfsansZeta" : "𝝛",
1137 1141 "\\mbfsansEta" : "𝝜",
1138 1142 "\\mbfsansTheta" : "𝝝",
1139 1143 "\\mbfsansIota" : "𝝞",
1140 1144 "\\mbfsansKappa" : "𝝟",
1141 1145 "\\mbfsansLambda" : "𝝠",
1142 1146 "\\mbfsansMu" : "𝝡",
1143 1147 "\\mbfsansNu" : "𝝢",
1144 1148 "\\mbfsansXi" : "𝝣",
1145 1149 "\\mbfsansOmicron" : "𝝤",
1146 1150 "\\mbfsansPi" : "𝝥",
1147 1151 "\\mbfsansRho" : "𝝦",
1148 1152 "\\mbfsansvarTheta" : "𝝧",
1149 1153 "\\mbfsansSigma" : "𝝨",
1150 1154 "\\mbfsansTau" : "𝝩",
1151 1155 "\\mbfsansUpsilon" : "𝝪",
1152 1156 "\\mbfsansPhi" : "𝝫",
1153 1157 "\\mbfsansChi" : "𝝬",
1154 1158 "\\mbfsansPsi" : "𝝭",
1155 1159 "\\mbfsansOmega" : "𝝮",
1156 1160 "\\mbfsansalpha" : "𝝰",
1157 1161 "\\mbfsansbeta" : "𝝱",
1158 1162 "\\mbfsansgamma" : "𝝲",
1159 1163 "\\mbfsansdelta" : "𝝳",
1160 1164 "\\mbfsansepsilon" : "𝝴",
1161 1165 "\\mbfsanszeta" : "𝝵",
1162 1166 "\\mbfsanseta" : "𝝶",
1163 1167 "\\mbfsanstheta" : "𝝷",
1164 1168 "\\mbfsansiota" : "𝝸",
1165 1169 "\\mbfsanskappa" : "𝝹",
1166 1170 "\\mbfsanslambda" : "𝝺",
1167 1171 "\\mbfsansmu" : "𝝻",
1168 1172 "\\mbfsansnu" : "𝝼",
1169 1173 "\\mbfsansxi" : "𝝽",
1170 1174 "\\mbfsansomicron" : "𝝾",
1171 1175 "\\mbfsanspi" : "𝝿",
1172 1176 "\\mbfsansrho" : "𝞀",
1173 1177 "\\mbfsansvarsigma" : "𝞁",
1174 1178 "\\mbfsanssigma" : "𝞂",
1175 1179 "\\mbfsanstau" : "𝞃",
1176 1180 "\\mbfsansupsilon" : "𝞄",
1177 1181 "\\mbfsansphi" : "𝞅",
1178 1182 "\\mbfsanschi" : "𝞆",
1179 1183 "\\mbfsanspsi" : "𝞇",
1180 1184 "\\mbfsansomega" : "𝞈",
1181 1185 "\\mbfsansvarepsilon" : "𝞊",
1182 1186 "\\mbfsansvartheta" : "𝞋",
1183 1187 "\\mbfsansvarkappa" : "𝞌",
1184 1188 "\\mbfsansvarphi" : "𝞍",
1185 1189 "\\mbfsansvarrho" : "𝞎",
1186 1190 "\\mbfsansvarpi" : "𝞏",
1187 1191 "\\mbfitsansAlpha" : "𝞐",
1188 1192 "\\mbfitsansBeta" : "𝞑",
1189 1193 "\\mbfitsansGamma" : "𝞒",
1190 1194 "\\mbfitsansDelta" : "𝞓",
1191 1195 "\\mbfitsansEpsilon" : "𝞔",
1192 1196 "\\mbfitsansZeta" : "𝞕",
1193 1197 "\\mbfitsansEta" : "𝞖",
1194 1198 "\\mbfitsansTheta" : "𝞗",
1195 1199 "\\mbfitsansIota" : "𝞘",
1196 1200 "\\mbfitsansKappa" : "𝞙",
1197 1201 "\\mbfitsansLambda" : "𝞚",
1198 1202 "\\mbfitsansMu" : "𝞛",
1199 1203 "\\mbfitsansNu" : "𝞜",
1200 1204 "\\mbfitsansXi" : "𝞝",
1201 1205 "\\mbfitsansOmicron" : "𝞞",
1202 1206 "\\mbfitsansPi" : "𝞟",
1203 1207 "\\mbfitsansRho" : "𝞠",
1204 1208 "\\mbfitsansvarTheta" : "𝞡",
1205 1209 "\\mbfitsansSigma" : "𝞢",
1206 1210 "\\mbfitsansTau" : "𝞣",
1207 1211 "\\mbfitsansUpsilon" : "𝞤",
1208 1212 "\\mbfitsansPhi" : "𝞥",
1209 1213 "\\mbfitsansChi" : "𝞦",
1210 1214 "\\mbfitsansPsi" : "𝞧",
1211 1215 "\\mbfitsansOmega" : "𝞨",
1212 1216 "\\mbfitsansalpha" : "𝞪",
1213 1217 "\\mbfitsansbeta" : "𝞫",
1214 1218 "\\mbfitsansgamma" : "𝞬",
1215 1219 "\\mbfitsansdelta" : "𝞭",
1216 1220 "\\mbfitsansepsilon" : "𝞮",
1217 1221 "\\mbfitsanszeta" : "𝞯",
1218 1222 "\\mbfitsanseta" : "𝞰",
1219 1223 "\\mbfitsanstheta" : "𝞱",
1220 1224 "\\mbfitsansiota" : "𝞲",
1221 1225 "\\mbfitsanskappa" : "𝞳",
1222 1226 "\\mbfitsanslambda" : "𝞴",
1223 1227 "\\mbfitsansmu" : "𝞵",
1224 1228 "\\mbfitsansnu" : "𝞶",
1225 1229 "\\mbfitsansxi" : "𝞷",
1226 1230 "\\mbfitsansomicron" : "𝞸",
1227 1231 "\\mbfitsanspi" : "𝞹",
1228 1232 "\\mbfitsansrho" : "𝞺",
1229 1233 "\\mbfitsansvarsigma" : "𝞻",
1230 1234 "\\mbfitsanssigma" : "𝞼",
1231 1235 "\\mbfitsanstau" : "𝞽",
1232 1236 "\\mbfitsansupsilon" : "𝞾",
1233 1237 "\\mbfitsansphi" : "𝞿",
1234 1238 "\\mbfitsanschi" : "𝟀",
1235 1239 "\\mbfitsanspsi" : "𝟁",
1236 1240 "\\mbfitsansomega" : "𝟂",
1237 1241 "\\mbfitsansvarepsilon" : "𝟄",
1238 1242 "\\mbfitsansvartheta" : "𝟅",
1239 1243 "\\mbfitsansvarkappa" : "𝟆",
1240 1244 "\\mbfitsansvarphi" : "𝟇",
1241 1245 "\\mbfitsansvarrho" : "𝟈",
1242 1246 "\\mbfitsansvarpi" : "𝟉",
1243 1247 "\\mbfzero" : "𝟎",
1244 1248 "\\mbfone" : "𝟏",
1245 1249 "\\mbftwo" : "𝟐",
1246 1250 "\\mbfthree" : "𝟑",
1247 1251 "\\mbffour" : "𝟒",
1248 1252 "\\mbffive" : "𝟓",
1249 1253 "\\mbfsix" : "𝟔",
1250 1254 "\\mbfseven" : "𝟕",
1251 1255 "\\mbfeight" : "𝟖",
1252 1256 "\\mbfnine" : "𝟗",
1253 1257 "\\Bbbzero" : "𝟘",
1254 1258 "\\Bbbone" : "𝟙",
1255 1259 "\\Bbbtwo" : "𝟚",
1256 1260 "\\Bbbthree" : "𝟛",
1257 1261 "\\Bbbfour" : "𝟜",
1258 1262 "\\Bbbfive" : "𝟝",
1259 1263 "\\Bbbsix" : "𝟞",
1260 1264 "\\Bbbseven" : "𝟟",
1261 1265 "\\Bbbeight" : "𝟠",
1262 1266 "\\Bbbnine" : "𝟡",
1263 1267 "\\msanszero" : "𝟢",
1264 1268 "\\msansone" : "𝟣",
1265 1269 "\\msanstwo" : "𝟤",
1266 1270 "\\msansthree" : "𝟥",
1267 1271 "\\msansfour" : "𝟦",
1268 1272 "\\msansfive" : "𝟧",
1269 1273 "\\msanssix" : "𝟨",
1270 1274 "\\msansseven" : "𝟩",
1271 1275 "\\msanseight" : "𝟪",
1272 1276 "\\msansnine" : "𝟫",
1273 1277 "\\mbfsanszero" : "𝟬",
1274 1278 "\\mbfsansone" : "𝟭",
1275 1279 "\\mbfsanstwo" : "𝟮",
1276 1280 "\\mbfsansthree" : "𝟯",
1277 1281 "\\mbfsansfour" : "𝟰",
1278 1282 "\\mbfsansfive" : "𝟱",
1279 1283 "\\mbfsanssix" : "𝟲",
1280 1284 "\\mbfsansseven" : "𝟳",
1281 1285 "\\mbfsanseight" : "𝟴",
1282 1286 "\\mbfsansnine" : "𝟵",
1283 1287 "\\mttzero" : "𝟶",
1284 1288 "\\mttone" : "𝟷",
1285 1289 "\\mtttwo" : "𝟸",
1286 1290 "\\mttthree" : "𝟹",
1287 1291 "\\mttfour" : "𝟺",
1288 1292 "\\mttfive" : "𝟻",
1289 1293 "\\mttsix" : "𝟼",
1290 1294 "\\mttseven" : "𝟽",
1291 1295 "\\mtteight" : "𝟾",
1292 1296 "\\mttnine" : "𝟿",
1293 1297 }
Show file before | Show file after | Hide comments
@@ -1,76 +1,87 b''
1 1 # coding: utf-8
2 2
3 3 # This script autogenerates `IPython.core.latex_symbols.py`, which contains a
4 4 # single dict , named `latex_symbols`. The keys in this dict are latex symbols,
5 5 # such as `\\alpha` and the values in the dict are the unicode equivalents for
6 6 # those. Most importantly, only unicode symbols that are valid identifers in
7 7 # Python 3 are included.
8 8
9 9 #
10 10 # The original mapping of latex symbols to unicode comes from the `latex_symbols.jl` files from Julia.
11 11
12 12 from __future__ import print_function
13 import os, sys
14
15 if not sys.version_info[0] == 3:
16 print("This script must be run with Python 3, exiting...")
17 sys.exit(1)
13 18
14 19 # Import the Julia LaTeX symbols
15 20 print('Importing latex_symbols.js from Julia...')
16 21 import requests
17 22 url = 'https://raw.githubusercontent.com/JuliaLang/julia/master/base/latex_symbols.jl'
18 23 r = requests.get(url)
19 24
20 25
21 26 # Build a list of key, value pairs
22 27 print('Building a list of (latex, unicode) key-vaule pairs...')
23 28 lines = r.text.splitlines()[60:]
24 29 lines = [line for line in lines if '=>' in line]
25 30 lines = [line.replace('=>',':') for line in lines]
26 31
27 32 def line_to_tuple(line):
28 33 """Convert a single line of the .jl file to a 2-tuple of strings like ("\\alpha", "α")"""
29 34 kv = line.split(',')[0].split(':')
30 35 # kv = tuple(line.strip(', ').split(':'))
31 36 k, v = kv[0].strip(' "'), kv[1].strip(' "')
32 37 # if not test_ident(v):
33 38 # print(line)
34 39 return k, v
35 40
36 41 assert line_to_tuple(' "\\sqrt" : "\u221A",') == ('\\sqrt', '\u221A')
37 42 lines = [line_to_tuple(line) for line in lines]
38 43
39 44
40 45 # Filter out non-valid identifiers
41 46 print('Filtering out characters that are not valid Python 3 identifiers')
42 47
43 48 def test_ident(i):
44 49 """Is the unicode string a valid Python 3 identifer."""
45 50 try:
46 51 exec('a%s = 10' % i, {}, {})
47 52 except SyntaxError:
48 53 return False
49 54 else:
50 55 return True
51 56
52 57 assert test_ident("α")
53 58 assert not test_ident('‴')
54 59
55 60 valid_idents = [line for line in lines if test_ident(line[1])]
56 61
57 62
58 63 # Write the `latex_symbols.py` module in the cwd
59 64
60 65 s = """# encoding: utf-8
61 66
67 # DO NOT EDIT THIS FILE BY HAND.
68
69 # To update this file, run the script /tools/gen_latex_symbols.py using Python 3
70
62 71 # This file is autogenerated from the file:
63 72 # https://raw.githubusercontent.com/JuliaLang/julia/master/base/latex_symbols.jl
64 73 # This original list is filtered to remove any unicode characters that are not valid
65 74 # Python identifiers.
66 75
67 76 latex_symbols = {\n
68 77 """
69 78 for line in valid_idents:
70 79 s += ' "%s" : "%s",\n' % (line[0], line[1])
71 80 s += "}\n"
72 81
73 with open('latex_symbols.py', 'w', encoding='utf-8') as f:
82 fn = os.path.join('..','IPython','core','latex_symbols.py')
83 print("Writing the file: %s" % fn)
84 with open(fn, 'w', encoding='utf-8') as f:
74 85 f.write(s)
75 86
76 87
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