1 # Translation table for Unicode symbols to LaTeX math commands
2 # for use with the translate() method of unicode objects.
4 # Includes commands from: standard LaTeX, amssymb, amsmath
33 949: u
'\\varepsilon ',
57 1014: u
'\\backepsilon ',
64 8245: u
'\\backprime ',
67 8459: u
'\\mathcal{H}',
68 8460: u
'\\mathfrak{H}',
71 8464: u
'\\mathcal{I}',
73 8466: u
'\\mathcal{L}',
79 8475: u
'\\mathcal{R}',
84 8488: u
'\\mathfrak{Z}',
85 8492: u
'\\mathcal{B}',
86 8493: u
'\\mathfrak{C}',
87 8496: u
'\\mathcal{E}',
88 8497: u
'\\mathcal{F}',
90 8499: u
'\\mathcal{M}',
95 8592: u
'\\leftarrow ',
97 8594: u
'\\rightarrow ',
98 8595: u
'\\downarrow ',
99 8596: u
'\\leftrightarrow ',
100 8597: u
'\\updownarrow ',
105 8602: u
'\\nleftarrow ',
106 8603: u
'\\nrightarrow ',
107 8606: u
'\\twoheadleftarrow ',
108 8608: u
'\\twoheadrightarrow ',
109 8610: u
'\\leftarrowtail ',
110 8611: u
'\\rightarrowtail ',
112 8617: u
'\\hookleftarrow ',
113 8618: u
'\\hookrightarrow ',
114 8619: u
'\\looparrowleft ',
115 8620: u
'\\looparrowright ',
116 8621: u
'\\leftrightsquigarrow ',
117 8622: u
'\\nleftrightarrow ',
120 8630: u
'\\curvearrowleft ',
121 8631: u
'\\curvearrowright ',
122 8634: u
'\\circlearrowleft ',
123 8635: u
'\\circlearrowright ',
124 8636: u
'\\leftharpoonup ',
125 8637: u
'\\leftharpoondown ',
126 8638: u
'\\upharpoonright ',
127 8639: u
'\\upharpoonleft ',
128 8640: u
'\\rightharpoonup ',
129 8641: u
'\\rightharpoondown ',
130 8642: u
'\\downharpoonright ',
131 8643: u
'\\downharpoonleft ',
132 8644: u
'\\rightleftarrows ',
133 8646: u
'\\leftrightarrows ',
134 8647: u
'\\leftleftarrows ',
135 8648: u
'\\upuparrows ',
136 8649: u
'\\rightrightarrows ',
137 8650: u
'\\downdownarrows ',
138 8651: u
'\\leftrightharpoons ',
139 8652: u
'\\rightleftharpoons ',
140 8653: u
'\\nLeftarrow ',
141 8654: u
'\\nLeftrightarrow ',
142 8655: u
'\\nRightarrow ',
143 8656: u
'\\Leftarrow ',
145 8658: u
'\\Rightarrow ',
146 8659: u
'\\Downarrow ',
147 8660: u
'\\Leftrightarrow ',
148 8661: u
'\\Updownarrow ',
149 8666: u
'\\Lleftarrow ',
150 8667: u
'\\Rrightarrow ',
151 8669: u
'\\rightsquigarrow ',
152 8672: u
'\\dashleftarrow ',
153 8674: u
'\\dashrightarrow ',
155 8705: u
'\\complement ',
159 8709: u
'\\varnothing ',
171 8726: u
'\\smallsetminus ',
181 8737: u
'\\measuredangle ',
182 8738: u
'\\sphericalangle ',
185 8741: u
'\\parallel ',
186 8742: u
'\\nparallel ',
195 8756: u
'\\therefore ',
207 8778: u
'\\approxeq ',
213 8786: u
'\\fallingdotseq ',
214 8787: u
'\\risingdotseq ',
217 8796: u
'\\triangleq ',
239 8828: u
'\\preccurlyeq ',
240 8829: u
'\\succcurlyeq ',
247 8838: u
'\\subseteq ',
248 8839: u
'\\supseteq ',
249 8840: u
'\\nsubseteq ',
250 8841: u
'\\nsupseteq ',
251 8842: u
'\\subsetneq ',
252 8843: u
'\\supsetneq ',
254 8847: u
'\\sqsubset ',
255 8848: u
'\\sqsupset ',
256 8849: u
'\\sqsubseteq ',
257 8850: u
'\\sqsupseteq ',
265 8858: u
'\\circledcirc ',
266 8859: u
'\\circledast ',
267 8861: u
'\\circleddash ',
269 8863: u
'\\boxminus ',
270 8864: u
'\\boxtimes ',
284 8882: u
'\\vartriangleleft ',
285 8883: u
'\\vartriangleright ',
286 8884: u
'\\trianglelefteq ',
287 8885: u
'\\trianglerighteq ',
288 8888: u
'\\multimap ',
289 8890: u
'\\intercal ',
291 8892: u
'\\barwedge ',
292 8896: u
'\\bigwedge ',
299 8903: u
'\\divideontimes ',
303 8907: u
'\\leftthreetimes ',
304 8908: u
'\\rightthreetimes ',
305 8909: u
'\\backsimeq ',
306 8910: u
'\\curlyvee ',
307 8911: u
'\\curlywedge ',
312 8916: u
'\\pitchfork ',
317 8922: u
'\\lesseqgtr ',
318 8923: u
'\\gtreqless ',
319 8926: u
'\\curlyeqprec ',
320 8927: u
'\\curlyeqsucc ',
325 8936: u
'\\precnsim ',
326 8937: u
'\\succnsim ',
327 8938: u
'\\ntriangleleft ',
328 8939: u
'\\ntriangleright ',
329 8940: u
'\\ntrianglelefteq ',
330 8941: u
'\\ntrianglerighteq ',
338 8988: u
'\\ulcorner ',
339 8989: u
'\\urcorner ',
340 8990: u
'\\llcorner ',
341 8991: u
'\\lrcorner ',
344 9182: u
'\\overbrace ',
345 9183: u
'\\underbrace ',
346 9651: u
'\\bigtriangleup ',
348 9661: u
'\\bigtriangledown ',
353 9724: u
'\\blacksquare ',
355 9824: u
'\\spadesuit ',
356 9825: u
'\\heartsuit ',
357 9826: u
'\\diamondsuit ',
358 9827: u
'\\clubsuit ',
362 10003: u
'\\checkmark ',
363 10016: u
'\\maltese ',
369 10229: u
'\\longleftarrow ',
370 10230: u
'\\longrightarrow ',
371 10231: u
'\\longleftrightarrow ',
372 10232: u
'\\Longleftarrow ',
373 10233: u
'\\Longrightarrow ',
374 10234: u
'\\Longleftrightarrow ',
375 10236: u
'\\longmapsto ',
376 10731: u
'\\blacklozenge ',
377 10741: u
'\\setminus ',
378 10752: u
'\\bigodot ',
379 10753: u
'\\bigoplus ',
380 10754: u
'\\bigotimes ',
381 10756: u
'\\biguplus ',
382 10758: u
'\\bigsqcup ',
386 10846: u
'\\doublebarwedge ',
387 10877: u
'\\leqslant ',
388 10878: u
'\\geqslant ',
389 10885: u
'\\lessapprox ',
390 10886: u
'\\gtrapprox ',
393 10889: u
'\\lnapprox ',
394 10890: u
'\\gnapprox ',
395 10891: u
'\\lesseqqgtr ',
396 10892: u
'\\gtreqqless ',
397 10901: u
'\\eqslantless ',
398 10902: u
'\\eqslantgtr ',
401 10935: u
'\\precapprox ',
402 10936: u
'\\succapprox ',
403 10937: u
'\\precnapprox ',
404 10938: u
'\\succnapprox ',
405 10949: u
'\\subseteqq ',
406 10950: u
'\\supseteqq ',
407 10955: u
'\\subsetneqq ',
408 10956: u
'\\supsetneqq ',
409 119808: u
'\\mathbf{A}',
410 119809: u
'\\mathbf{B}',
411 119810: u
'\\mathbf{C}',
412 119811: u
'\\mathbf{D}',
413 119812: u
'\\mathbf{E}',
414 119813: u
'\\mathbf{F}',
415 119814: u
'\\mathbf{G}',
416 119815: u
'\\mathbf{H}',
417 119816: u
'\\mathbf{I}',
418 119817: u
'\\mathbf{J}',
419 119818: u
'\\mathbf{K}',
420 119819: u
'\\mathbf{L}',
421 119820: u
'\\mathbf{M}',
422 119821: u
'\\mathbf{N}',
423 119822: u
'\\mathbf{O}',
424 119823: u
'\\mathbf{P}',
425 119824: u
'\\mathbf{Q}',
426 119825: u
'\\mathbf{R}',
427 119826: u
'\\mathbf{S}',
428 119827: u
'\\mathbf{T}',
429 119828: u
'\\mathbf{U}',
430 119829: u
'\\mathbf{V}',
431 119830: u
'\\mathbf{W}',
432 119831: u
'\\mathbf{X}',
433 119832: u
'\\mathbf{Y}',
434 119833: u
'\\mathbf{Z}',
435 119834: u
'\\mathbf{a}',
436 119835: u
'\\mathbf{b}',
437 119836: u
'\\mathbf{c}',
438 119837: u
'\\mathbf{d}',
439 119838: u
'\\mathbf{e}',
440 119839: u
'\\mathbf{f}',
441 119840: u
'\\mathbf{g}',
442 119841: u
'\\mathbf{h}',
443 119842: u
'\\mathbf{i}',
444 119843: u
'\\mathbf{j}',
445 119844: u
'\\mathbf{k}',
446 119845: u
'\\mathbf{l}',
447 119846: u
'\\mathbf{m}',
448 119847: u
'\\mathbf{n}',
449 119848: u
'\\mathbf{o}',
450 119849: u
'\\mathbf{p}',
451 119850: u
'\\mathbf{q}',
452 119851: u
'\\mathbf{r}',
453 119852: u
'\\mathbf{s}',
454 119853: u
'\\mathbf{t}',
455 119854: u
'\\mathbf{u}',
456 119855: u
'\\mathbf{v}',
457 119856: u
'\\mathbf{w}',
458 119857: u
'\\mathbf{x}',
459 119858: u
'\\mathbf{y}',
460 119859: u
'\\mathbf{z}',
512 119964: u
'\\mathcal{A}',
513 119966: u
'\\mathcal{C}',
514 119967: u
'\\mathcal{D}',
515 119970: u
'\\mathcal{G}',
516 119973: u
'\\mathcal{J}',
517 119974: u
'\\mathcal{K}',
518 119977: u
'\\mathcal{N}',
519 119978: u
'\\mathcal{O}',
520 119979: u
'\\mathcal{P}',
521 119980: u
'\\mathcal{Q}',
522 119982: u
'\\mathcal{S}',
523 119983: u
'\\mathcal{T}',
524 119984: u
'\\mathcal{U}',
525 119985: u
'\\mathcal{V}',
526 119986: u
'\\mathcal{W}',
527 119987: u
'\\mathcal{X}',
528 119988: u
'\\mathcal{Y}',
529 119989: u
'\\mathcal{Z}',
530 120068: u
'\\mathfrak{A}',
531 120069: u
'\\mathfrak{B}',
532 120071: u
'\\mathfrak{D}',
533 120072: u
'\\mathfrak{E}',
534 120073: u
'\\mathfrak{F}',
535 120074: u
'\\mathfrak{G}',
536 120077: u
'\\mathfrak{J}',
537 120078: u
'\\mathfrak{K}',
538 120079: u
'\\mathfrak{L}',
539 120080: u
'\\mathfrak{M}',
540 120081: u
'\\mathfrak{N}',
541 120082: u
'\\mathfrak{O}',
542 120083: u
'\\mathfrak{P}',
543 120084: u
'\\mathfrak{Q}',
544 120086: u
'\\mathfrak{S}',
545 120087: u
'\\mathfrak{T}',
546 120088: u
'\\mathfrak{U}',
547 120089: u
'\\mathfrak{V}',
548 120090: u
'\\mathfrak{W}',
549 120091: u
'\\mathfrak{X}',
550 120092: u
'\\mathfrak{Y}',
551 120094: u
'\\mathfrak{a}',
552 120095: u
'\\mathfrak{b}',
553 120096: u
'\\mathfrak{c}',
554 120097: u
'\\mathfrak{d}',
555 120098: u
'\\mathfrak{e}',
556 120099: u
'\\mathfrak{f}',
557 120100: u
'\\mathfrak{g}',
558 120101: u
'\\mathfrak{h}',
559 120102: u
'\\mathfrak{i}',
560 120103: u
'\\mathfrak{j}',
561 120104: u
'\\mathfrak{k}',
562 120105: u
'\\mathfrak{l}',
563 120106: u
'\\mathfrak{m}',
564 120107: u
'\\mathfrak{n}',
565 120108: u
'\\mathfrak{o}',
566 120109: u
'\\mathfrak{p}',
567 120110: u
'\\mathfrak{q}',
568 120111: u
'\\mathfrak{r}',
569 120112: u
'\\mathfrak{s}',
570 120113: u
'\\mathfrak{t}',
571 120114: u
'\\mathfrak{u}',
572 120115: u
'\\mathfrak{v}',
573 120116: u
'\\mathfrak{w}',
574 120117: u
'\\mathfrak{x}',
575 120118: u
'\\mathfrak{y}',
576 120119: u
'\\mathfrak{z}',
577 120120: u
'\\mathbb{A}',
578 120121: u
'\\mathbb{B}',
579 120123: u
'\\mathbb{D}',
580 120124: u
'\\mathbb{E}',
581 120125: u
'\\mathbb{F}',
582 120126: u
'\\mathbb{G}',
583 120128: u
'\\mathbb{I}',
584 120129: u
'\\mathbb{J}',
585 120130: u
'\\mathbb{K}',
586 120131: u
'\\mathbb{L}',
587 120132: u
'\\mathbb{M}',
588 120134: u
'\\mathbb{O}',
589 120138: u
'\\mathbb{S}',
590 120139: u
'\\mathbb{T}',
591 120140: u
'\\mathbb{U}',
592 120141: u
'\\mathbb{V}',
593 120142: u
'\\mathbb{W}',
594 120143: u
'\\mathbb{X}',
595 120144: u
'\\mathbb{Y}',
597 120224: u
'\\mathsf{A}',
598 120225: u
'\\mathsf{B}',
599 120226: u
'\\mathsf{C}',
600 120227: u
'\\mathsf{D}',
601 120228: u
'\\mathsf{E}',
602 120229: u
'\\mathsf{F}',
603 120230: u
'\\mathsf{G}',
604 120231: u
'\\mathsf{H}',
605 120232: u
'\\mathsf{I}',
606 120233: u
'\\mathsf{J}',
607 120234: u
'\\mathsf{K}',
608 120235: u
'\\mathsf{L}',
609 120236: u
'\\mathsf{M}',
610 120237: u
'\\mathsf{N}',
611 120238: u
'\\mathsf{O}',
612 120239: u
'\\mathsf{P}',
613 120240: u
'\\mathsf{Q}',
614 120241: u
'\\mathsf{R}',
615 120242: u
'\\mathsf{S}',
616 120243: u
'\\mathsf{T}',
617 120244: u
'\\mathsf{U}',
618 120245: u
'\\mathsf{V}',
619 120246: u
'\\mathsf{W}',
620 120247: u
'\\mathsf{X}',
621 120248: u
'\\mathsf{Y}',
622 120249: u
'\\mathsf{Z}',
623 120250: u
'\\mathsf{a}',
624 120251: u
'\\mathsf{b}',
625 120252: u
'\\mathsf{c}',
626 120253: u
'\\mathsf{d}',
627 120254: u
'\\mathsf{e}',
628 120255: u
'\\mathsf{f}',
629 120256: u
'\\mathsf{g}',
630 120257: u
'\\mathsf{h}',
631 120258: u
'\\mathsf{i}',
632 120259: u
'\\mathsf{j}',
633 120260: u
'\\mathsf{k}',
634 120261: u
'\\mathsf{l}',
635 120262: u
'\\mathsf{m}',
636 120263: u
'\\mathsf{n}',
637 120264: u
'\\mathsf{o}',
638 120265: u
'\\mathsf{p}',
639 120266: u
'\\mathsf{q}',
640 120267: u
'\\mathsf{r}',
641 120268: u
'\\mathsf{s}',
642 120269: u
'\\mathsf{t}',
643 120270: u
'\\mathsf{u}',
644 120271: u
'\\mathsf{v}',
645 120272: u
'\\mathsf{w}',
646 120273: u
'\\mathsf{x}',
647 120274: u
'\\mathsf{y}',
648 120275: u
'\\mathsf{z}',
649 120432: u
'\\mathtt{A}',
650 120433: u
'\\mathtt{B}',
651 120434: u
'\\mathtt{C}',
652 120435: u
'\\mathtt{D}',
653 120436: u
'\\mathtt{E}',
654 120437: u
'\\mathtt{F}',
655 120438: u
'\\mathtt{G}',
656 120439: u
'\\mathtt{H}',
657 120440: u
'\\mathtt{I}',
658 120441: u
'\\mathtt{J}',
659 120442: u
'\\mathtt{K}',
660 120443: u
'\\mathtt{L}',
661 120444: u
'\\mathtt{M}',
662 120445: u
'\\mathtt{N}',
663 120446: u
'\\mathtt{O}',
664 120447: u
'\\mathtt{P}',
665 120448: u
'\\mathtt{Q}',
666 120449: u
'\\mathtt{R}',
667 120450: u
'\\mathtt{S}',
668 120451: u
'\\mathtt{T}',
669 120452: u
'\\mathtt{U}',
670 120453: u
'\\mathtt{V}',
671 120454: u
'\\mathtt{W}',
672 120455: u
'\\mathtt{X}',
673 120456: u
'\\mathtt{Y}',
674 120457: u
'\\mathtt{Z}',
675 120458: u
'\\mathtt{a}',
676 120459: u
'\\mathtt{b}',
677 120460: u
'\\mathtt{c}',
678 120461: u
'\\mathtt{d}',
679 120462: u
'\\mathtt{e}',
680 120463: u
'\\mathtt{f}',
681 120464: u
'\\mathtt{g}',
682 120465: u
'\\mathtt{h}',
683 120466: u
'\\mathtt{i}',
684 120467: u
'\\mathtt{j}',
685 120468: u
'\\mathtt{k}',
686 120469: u
'\\mathtt{l}',
687 120470: u
'\\mathtt{m}',
688 120471: u
'\\mathtt{n}',
689 120472: u
'\\mathtt{o}',
690 120473: u
'\\mathtt{p}',
691 120474: u
'\\mathtt{q}',
692 120475: u
'\\mathtt{r}',
693 120476: u
'\\mathtt{s}',
694 120477: u
'\\mathtt{t}',
695 120478: u
'\\mathtt{u}',
696 120479: u
'\\mathtt{v}',
697 120480: u
'\\mathtt{w}',
698 120481: u
'\\mathtt{x}',
699 120482: u
'\\mathtt{y}',
700 120483: u
'\\mathtt{z}',
703 120490: u
'\\mathbf{\\Gamma}',
704 120491: u
'\\mathbf{\\Delta}',
705 120495: u
'\\mathbf{\\Theta}',
706 120498: u
'\\mathbf{\\Lambda}',
707 120501: u
'\\mathbf{\\Xi}',
708 120503: u
'\\mathbf{\\Pi}',
709 120506: u
'\\mathbf{\\Sigma}',
710 120508: u
'\\mathbf{\\Upsilon}',
711 120509: u
'\\mathbf{\\Phi}',
712 120511: u
'\\mathbf{\\Psi}',
713 120512: u
'\\mathbf{\\Omega}',
714 120548: u
'\\mathit{\\Gamma}',
715 120549: u
'\\mathit{\\Delta}',
716 120553: u
'\\mathit{\\Theta}',
717 120556: u
'\\mathit{\\Lambda}',
718 120559: u
'\\mathit{\\Xi}',
719 120561: u
'\\mathit{\\Pi}',
720 120564: u
'\\mathit{\\Sigma}',
721 120566: u
'\\mathit{\\Upsilon}',
722 120567: u
'\\mathit{\\Phi}',
723 120569: u
'\\mathit{\\Psi}',
724 120570: u
'\\mathit{\\Omega}',
729 120576: u
'\\varepsilon ',
735 120582: u
'\\lambda ',
741 120589: u
'\\varsigma ',
744 120592: u
'\\upsilon ',
745 120593: u
'\\varphi ',
749 120597: u
'\\partial ',
750 120598: u
'\\epsilon ',
751 120599: u
'\\vartheta ',
752 120600: u
'\\varkappa ',
754 120602: u
'\\varrho ',
756 120782: u
'\\mathbf{0}',
757 120783: u
'\\mathbf{1}',
758 120784: u
'\\mathbf{2}',
759 120785: u
'\\mathbf{3}',
760 120786: u
'\\mathbf{4}',
761 120787: u
'\\mathbf{5}',
762 120788: u
'\\mathbf{6}',
763 120789: u
'\\mathbf{7}',
764 120790: u
'\\mathbf{8}',
765 120791: u
'\\mathbf{9}',
766 120802: u
'\\mathsf{0}',
767 120803: u
'\\mathsf{1}',
768 120804: u
'\\mathsf{2}',
769 120805: u
'\\mathsf{3}',
770 120806: u
'\\mathsf{4}',
771 120807: u
'\\mathsf{5}',
772 120808: u
'\\mathsf{6}',
773 120809: u
'\\mathsf{7}',
774 120810: u
'\\mathsf{8}',
775 120811: u
'\\mathsf{9}',
776 120822: u
'\\mathtt{0}',
777 120823: u
'\\mathtt{1}',
778 120824: u
'\\mathtt{2}',
779 120825: u
'\\mathtt{3}',
780 120826: u
'\\mathtt{4}',
781 120827: u
'\\mathtt{5}',
782 120828: u
'\\mathtt{6}',
783 120829: u
'\\mathtt{7}',
784 120830: u
'\\mathtt{8}',
785 120831: u
'\\mathtt{9}',