esh-latex-escape.el

;;; esh-latex-escape.el --- A table of character → LaTeX macro mappings  -*- lexical-binding: t; -*-

;; Copyright (C) 2016  Clément Pit-Claudel

;; Author: Clément Pit-Claudel <clement.pitclaudel@live.com>
;; Package-Requires: ((emacs "24.3"))
;; Package-Version: 0.1
;; Keywords: faces
;; URL: https://github.com/cpitclaudel/esh2tex

;; This program is free software; you can redistribute it and/or modify
;; it under the terms of the GNU General Public License as published by
;; the Free Software Foundation, either version 3 of the License, or
;; (at your option) any later version.

;; This program is distributed in the hope that it will be useful,
;; but WITHOUT ANY WARRANTY; without even the implied warranty of
;; MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
;; GNU General Public License for more details.

;; You should have received a copy of the GNU General Public License
;; along with this program.  If not, see <http://www.gnu.org/licenses/>.

;;; Commentary:

;; This table is used to highlight symbols in a pdfLaTeX-friendly way.

;;; Code:

(defvar esh-latex-escape-table
  #s(hash-table
     size 1642 test eq rehash-size 1.5 rehash-threshold 0.8 data
     (?  "~" ?¢ "\\cent" ?£ "\\pounds" ?¥ "\\yen"
         ?¨ "\\spddot" ?¬ "\\neg" ?® "\\circledR" ?± "\\pm"
         ?× "\\times" ?ð "\\eth" ?÷ "\\div" ?ı "\\imath"
         ?ȷ "\\jmath" ?̀ "\\grave" ?́ "\\acute" ?̂ "\\hat"
         ?̃ "\\tilde" ?̄ "\\bar" ?̅ "\\overline" ?̆ "\\breve"
         ?̇ "\\dot" ?̈ "\\ddot" ?̊ "\\mathring" ?̌ "\\check"
         ?̰ "\\utilde" ?̱ "\\underbar" ?̲ "\\underline" ?̸ "\\not"
         ?Γ "\\Gamma" ?Δ "\\Delta" ?Θ "\\Theta" ?Λ "\\Lambda"
         ?Ξ "\\Xi" ?Π "\\Pi" ?Σ "\\Sigma" ?Υ "\\Upsilon"
         ?Φ "\\Phi" ?Ψ "\\Psi" ?Ω "\\Omega" ?α "\\alpha"
         ?β "\\beta" ?γ "\\gamma" ?δ "\\delta" ?ε "\\varepsilon"
         ?ζ "\\zeta" ?η "\\eta" ?θ "\\theta" ?ι "\\iota"
         ?κ "\\kappa" ?λ "\\lambda" ?μ "\\mu" ?ν "\\nu"
         ?ξ "\\xi" ?π "\\pi" ?ρ "\\rho" ?ς "\\varsigma"
         ?σ "\\sigma" ?τ "\\tau" ?υ "\\upsilon" ?φ "\\varphi"
         ?χ "\\chi" ?ψ "\\psi" ?ω "\\omega" ?ϐ "\\varbeta"
         ?ϑ "\\vartheta" ?ϕ "\\phi" ?ϖ "\\varpi" ?Ϙ "\\Qoppa"
         ?ϙ "\\qoppa" ?Ϛ "\\Stigma" ?ϛ "\\stigma" ?Ϝ "\\Digamma"
         ?ϝ "\\digamma" ?Ϟ "\\Koppa" ?ϟ "\\koppa" ?Ϡ "\\Sampi"
         ?ϡ "\\sampi" ?ϱ "\\varrho" ?ϵ "\\epsilon" ?϶ "\\backepsilon"
         ?  "\\quad" ?‖ "\\|" ?† "\\dagger" ?‡ "\\ddagger"
         ?… "\\ldots" ?′ "\\prime" ?″ "\\second" ?‴ "\\third"
         ?‵ "\\backprime" ?⁀ "\\cat" ?⁗ "\\fourth" ?  "\\:"
         ?⃐ "\\leftharpoonaccent" ?⃑ "\\rightharpoonaccent" ?⃖ "\\overleftarrow" ?⃗ "\\vec"
         ?⃛ "\\dddot" ?⃜ "\\ddddot" ?⃡ "\\overleftrightarrow" ?⃮ "\\underleftarrow"
         ?⃯ "\\underrightarrow" ?ℂ "\\mathbb{C}" ?ℇ "\\Eulerconst" ?ℊ "\\mathcal{g}"
         ?ℋ "\\mathcal{H}" ?ℌ "\\mathfrak{H}" ?ℍ "\\mathbb{H}" ?ℏ "\\hslash"
         ?ℐ "\\mathcal{I}" ?ℑ "\\Im" ?ℒ "\\mathcal{L}" ?ℓ "\\ell"
         ?ℕ "\\mathbb{N}" ?℘ "\\wp" ?ℙ "\\mathbb{P}" ?ℚ "\\mathbb{Q}"
         ?ℛ "\\mathcal{R}" ?ℜ "\\Re" ?ℝ "\\mathbb{R}" ?ℤ "\\mathbb{Z}"
         ?Ω "\\tcohm" ?℧ "\\mho" ?ℨ "\\mathfrak{Z}" ?Å "\\Angstrom"
         ?ℬ "\\mathcal{B}" ?ℭ "\\mathfrak{C}" ?ℯ "\\mathcal{e}" ?ℰ "\\mathcal{E}"
         ?ℱ "\\mathcal{F}" ?Ⅎ "\\Finv" ?ℳ "\\mathcal{M}" ?ℴ "\\mathcal{o}"
         ?ℵ "\\aleph" ?ℶ "\\beth" ?ℷ "\\gimel" ?ℸ "\\daleth"
         ?ℼ "\\mathbb{\\pi}" ?ℽ "\\mathbb{\\gamma}" ?ℾ "\\mathbb{\\Gamma}" ?ℿ "\\mathbb{\\Pi}"
         ?⅀ "\\mathbb{\\Sigma}" ?⅄ "\\Yup" ?ⅅ "\\mitBbbD" ?ⅆ "\\mitBbbd"
         ?ⅇ "\\mitBbbe" ?ⅈ "\\mitBbbi" ?ⅉ "\\mitBbbj" ?⅋ "\\invamp"
         ?← "\\leftarrow" ?↑ "\\uparrow" ?→ "\\rightarrow" ?↓ "\\downarrow"
         ?↔ "\\leftrightarrow" ?↕ "\\updownarrow" ?↖ "\\nwarrow" ?↗ "\\nearrow"
         ?↘ "\\searrow" ?↙ "\\swarrow" ?↚ "\\nleftarrow" ?↛ "\\nrightarrow"
         ?↞ "\\twoheadleftarrow" ?↠ "\\twoheadrightarrow" ?↢ "\\leftarrowtail" ?↣ "\\rightarrowtail"
         ?↤ "\\mapsfrom" ?↥ "\\mapsup" ?↦ "\\mapsto" ?↧ "\\mapsdown"
         ?↩ "\\hookleftarrow" ?↪ "\\hookrightarrow" ?↫ "\\looparrowleft" ?↬ "\\looparrowright"
         ?↭ "\\leftrightsquigarrow" ?↮ "\\nleftrightarrow" ?↯ "\\lightning" ?↰ "\\Lsh"
         ?↱ "\\Rsh" ?↲ "\\dlsh" ?↳ "\\drsh" ?↶ "\\curvearrowleft"
         ?↷ "\\curvearrowright" ?↺ "\\circlearrowleft" ?↻ "\\circlearrowright" ?↼ "\\leftharpoonup"
         ?↽ "\\leftharpoondown" ?↾ "\\upharpoonright" ?↿ "\\upharpoonleft" ?⇀ "\\rightharpoonup"
         ?⇁ "\\rightharpoondown" ?⇂ "\\downharpoonright" ?⇃ "\\downharpoonleft" ?⇄ "\\rightleftarrows"
         ?⇅ "\\updownarrows" ?⇆ "\\leftrightarrows" ?⇇ "\\leftleftarrows" ?⇈ "\\upuparrows"
         ?⇉ "\\rightrightarrows" ?⇊ "\\downdownarrows" ?⇋ "\\leftrightharpoons" ?⇌ "\\rightleftharpoons"
         ?⇍ "\\nLeftarrow" ?⇎ "\\nLeftrightarrow" ?⇏ "\\nRightarrow" ?⇐ "\\Leftarrow"
         ?⇑ "\\Uparrow" ?⇒ "\\Rightarrow" ?⇓ "\\Downarrow" ?⇔ "\\Leftrightarrow"
         ?⇕ "\\Updownarrow" ?⇖ "\\Nwarrow" ?⇗ "\\Nearrow" ?⇘ "\\Searrow"
         ?⇙ "\\Swarrow" ?⇚ "\\Lleftarrow" ?⇛ "\\Rrightarrow" ?⇜ "\\leftsquigarrow"
         ?⇝ "\\rightsquigarrow" ?⇠ "\\dashleftarrow" ?⇢ "\\dashrightarrow" ?⇤ "\\barleftarrow"
         ?⇥ "\\rightarrowbar" ?⇵ "\\downuparrows" ?⇸ "\\pfun" ?⇻ "\\ffun"
         ?⇽ "\\leftarrowtriangle" ?⇾ "\\rightarrowtriangle" ?⇿ "\\leftrightarrowtriangle" ?∀ "\\forall"
         ?∁ "\\complement" ?∂ "\\partial" ?∃ "\\exists" ?∄ "\\nexists"
         ?∅ "\\varnothing" ?∇ "\\nabla" ?∈ "\\in" ?∉ "\\notin"
         ?∋ "\\ni" ?∌ "\\nni" ?∏ "\\prod" ?∐ "\\coprod"
         ?∑ "\\sum" ?− "-" ?∓ "\\mp" ?∔ "\\dotplus"
         ?∕ "\\slash" ?∖ "\\smallsetminus" ?∗ "\\ast" ?∘ "\\circ"
         ?∙ "\\bullet" ?√ "\\sqrt" ?∛ "\\sqrt[3]" ?∜ "\\sqrt[4]"
         ?∝ "\\propto" ?∞ "\\infty" ?∟ "\\rightangle" ?∠ "\\angle"
         ?∡ "\\measuredangle" ?∢ "\\sphericalangle" ?∣ "\\mid" ?∤ "\\nmid"
         ?∥ "\\parallel" ?∦ "\\nparallel" ?∧ "\\wedge" ?∨ "\\vee"
         ?∩ "\\cap" ?∪ "\\cup" ?∫ "\\int" ?∬ "\\iint"
         ?∭ "\\iiint" ?∮ "\\oint" ?∯ "\\oiint" ?∰ "\\oiiint"
         ?∲ "\\varointclockwise" ?∳ "\\ointctrclockwise" ?∴ "\\therefore" ?∵ "\\because"
         ?∶ ":" ?∷ "\\Colon" ?∹ "\\eqcolon" ?∼ "\\sim"
         ?∽ "\\backsim" ?∿ "\\AC" ?≀ "\\wr" ?≁ "\\nsim"
         ?≂ "\\eqsim" ?≃ "\\simeq" ?≄ "\\nsimeq" ?≅ "\\cong"
         ?≇ "\\ncong" ?≈ "\\approx" ?≉ "\\napprox" ?≊ "\\approxeq"
         ?≍ "\\asymp" ?≎ "\\Bumpeq" ?≏ "\\bumpeq" ?≐ "\\doteq"
         ?≑ "\\Doteq" ?≒ "\\fallingdotseq" ?≓ "\\risingdotseq" ?≔ "\\coloneq"
         ?≕ "\\eqcolon" ?≖ "\\eqcirc" ?≗ "\\circeq" ?≙ "\\corresponds"
         ?≜ "\\triangleq" ?≠ "\\neq" ?≡ "\\equiv" ?≢ "\\nequiv"
         ?≤ "\\leq" ?≥ "\\geq" ?≦ "\\leqq" ?≧ "\\geqq"
         ?≨ "\\lneqq" ?≩ "\\gneqq" ?≪ "\\ll" ?≫ "\\gg"
         ?≬ "\\between" ?≭ "\\notasymp" ?≮ "\\nless" ?≯ "\\ngtr"
         ?≰ "\\nleq" ?≱ "\\ngeq" ?≲ "\\lesssim" ?≳ "\\gtrsim"
         ?≴ "\\nlesssim" ?≵ "\\ngtrsim" ?≶ "\\lessgtr" ?≷ "\\gtrless"
         ?≸ "\\nlessgtr" ?≹ "\\ngtrless" ?≺ "\\prec" ?≻ "\\succ"
         ?≼ "\\preccurlyeq" ?≽ "\\succcurlyeq" ?≾ "\\precsim" ?≿ "\\succsim"
         ?⊀ "\\nprec" ?⊁ "\\nsucc" ?⊂ "\\subset" ?⊃ "\\supset"
         ?⊄ "\\nsubset" ?⊅ "\\nsupset" ?⊆ "\\subseteq" ?⊇ "\\supseteq"
         ?⊈ "\\nsubseteq" ?⊉ "\\nsupseteq" ?⊊ "\\subsetneq" ?⊋ "\\supsetneq"
         ?⊎ "\\uplus" ?⊏ "\\sqsubset" ?⊐ "\\sqsupset" ?⊑ "\\sqsubseteq"
         ?⊒ "\\sqsupseteq" ?⊓ "\\sqcap" ?⊔ "\\sqcup" ?⊕ "\\oplus"
         ?⊖ "\\ominus" ?⊗ "\\otimes" ?⊘ "\\oslash" ?⊙ "\\odot"
         ?⊚ "\\circledcirc" ?⊛ "\\circledast" ?⊝ "\\circleddash" ?⊞ "\\boxplus"
         ?⊟ "\\boxminus" ?⊠ "\\boxtimes" ?⊡ "\\boxdot" ?⊢ "\\vdash"
         ?⊣ "\\dashv" ?⊤ "\\top" ?⊥ "\\bot" ?⊧ "\\models"
         ?⊨ "\\vDash" ?⊩ "\\Vdash" ?⊪ "\\Vvdash" ?⊫ "\\VDash"
         ?⊬ "\\nvdash" ?⊭ "\\nvDash" ?⊮ "\\nVdash" ?⊯ "\\nVDash"
         ?⊲ "\\vartriangleleft" ?⊳ "\\vartriangleright" ?⊴ "\\trianglelefteq" ?⊵ "\\trianglerighteq"
         ?⊶ "\\multimapdotbothA" ?⊷ "\\multimapdotbothB" ?⊸ "\\multimap" ?⊺ "\\intercal"
         ?⊻ "\\veebar" ?⊼ "\\barwedge" ?⋀ "\\bigwedge" ?⋁ "\\bigvee"
         ?⋂ "\\bigcap" ?⋃ "\\bigcup" ?⋄ "\\diamond" ?⋅ "\\cdot"
         ?⋆ "\\star" ?⋇ "\\divideontimes" ?⋈ "\\bowtie" ?⋉ "\\ltimes"
         ?⋊ "\\rtimes" ?⋋ "\\leftthreetimes" ?⋌ "\\rightthreetimes" ?⋍ "\\backsimeq"
         ?⋎ "\\curlyvee" ?⋏ "\\curlywedge" ?⋐ "\\Subset" ?⋑ "\\Supset"
         ?⋒ "\\Cap" ?⋓ "\\Cup" ?⋔ "\\pitchfork" ?⋕ "\\hash"
         ?⋖ "\\lessdot" ?⋗ "\\gtrdot" ?⋘ "\\lll" ?⋙ "\\ggg"
         ?⋚ "\\lesseqgtr" ?⋛ "\\gtreqless" ?⋞ "\\curlyeqprec" ?⋟ "\\curlyeqsucc"
         ?⋠ "\\npreceq" ?⋡ "\\nsucceq" ?⋢ "\\nsqsubseteq" ?⋣ "\\nsqsupseteq"
         ?⋦ "\\lnsim" ?⋧ "\\gnsim" ?⋨ "\\precnsim" ?⋩ "\\succnsim"
         ?⋪ "\\ntriangleleft" ?⋫ "\\ntriangleright" ?⋬ "\\ntrianglelefteq" ?⋭ "\\ntrianglerighteq"
         ?⋮ "\\vdots" ?⋯ "\\cdots" ?⋰ "\\iddots" ?⋱ "\\ddots"
         ?⋶ "\\barin" ?⌀ "\\diameter" ?⌈ "\\lceil" ?⌉ "\\rceil"
         ?⌊ "\\lfloor" ?⌋ "\\rfloor" ?⌐ "\\invneg" ?⌑ "\\wasylozenge"
         ?⌜ "\\ulcorner" ?⌝ "\\urcorner" ?⌞ "\\llcorner" ?⌟ "\\lrcorner"
         ?⌢ "\\frown" ?⌣ "\\smile" ?⌹ "\\APLinv" ?⌿ "\\notslash"
         ?⍀ "\\notbackslash" ?⍇ "\\APLleftarrowbox" ?⍈ "\\APLrightarrowbox" ?⍐ "\\APLuparrowbox"
         ?⍗ "\\APLdownarrowbox" ?⍝ "\\APLcomment" ?⍞ "\\APLinput" ?⍟ "\\APLlog"
         ?⏜ "\\overparen" ?⏝ "\\underparen" ?⏞ "\\overbrace" ?⏟ "\\underbrace"
         ?△ "\\bigtriangleup" ?▴ "\\blacktriangleup" ?▵ "\\smalltriangleup" ?▶ "\\RHD"
         ?▷ "\\rhd" ?▸ "\\blacktriangleright" ?▹ "\\smalltriangleright" ?▽ "\\bigtriangledown"
         ?▾ "\\blacktriangledown" ?▿ "\\smalltriangledown" ?◀ "\\LHD" ?◁ "\\lhd"
         ?◂ "\\blacktriangleleft" ?◃ "\\smalltriangleleft" ?◆ "\\Diamondblack" ?◇ "\\Diamond"
         ?◊ "\\lozenge" ?○ "\\Circle" ?● "\\CIRCLE" ?◐ "\\LEFTcircle"
         ?◑ "\\RIGHTcircle" ?◖ "\\LEFTCIRCLE" ?◗ "\\RIGHTCIRCLE" ?◫ "\\boxbar"
         ?◻ "\\square" ?◼ "\\blacksquare" ?★ "\\bigstar" ?☉ "\\Sun"
         ?☐ "\\Square" ?☑ "\\CheckedBox" ?☒ "\\XBox" ?☕ "\\steaming"
         ?☞ "\\pointright" ?☠ "\\skull" ?☢ "\\radiation" ?☣ "\\biohazard"
         ?☯ "\\yinyang" ?☹ "\\frownie" ?☺ "\\smiley" ?☻ "\\blacksmiley"
         ?☼ "\\sun" ?☽ "\\rightmoon" ?☾ "\\leftmoon" ?☿ "\\mercury"
         ?♀ "\\female" ?♁ "\\earth" ?♂ "\\male" ?♃ "\\jupiter"
         ?♄ "\\saturn" ?♅ "\\uranus" ?♆ "\\neptune" ?♇ "\\pluto"
         ?♈ "\\aries" ?♉ "\\taurus" ?♊ "\\gemini" ?♋ "\\cancer"
         ?♌ "\\leo" ?♍ "\\virgo" ?♎ "\\libra" ?♏ "\\scorpio"
         ?♐ "\\sagittarius" ?♑ "\\capricornus" ?♒ "\\aquarius" ?♓ "\\pisces"
         ?♠ "\\spadesuit" ?♡ "\\heartsuit" ?♢ "\\diamondsuit" ?♣ "\\clubsuit"
         ?♤ "\\varspadesuit" ?♥ "\\varheartsuit" ?♦ "\\vardiamondsuit" ?♧ "\\varclubsuit"
         ?♩ "\\quarternote" ?♪ "\\eighthnote" ?♫ "\\twonotes" ?♬ "\\sixteenthnote"
         ?♭ "\\flat" ?♮ "\\natural" ?♯ "\\sharp" ?♻ "\\recycle"
         ?⚓ "\\anchor" ?⚔ "\\swords" ?⚠ "\\warning" ?⚪ "\\medcirc"
         ?⚫ "\\medbullet" ?✎ "\\pencil" ?✓ "\\checkmark" ?✗ "\\ballotx"
         ?✠ "\\maltese" ?➢ "\\arrowbullet" ?⟂ "\\perp" ?⟅ "\\Lbag"
         ?⟆ "\\Rbag" ?⟐ "\\Diamonddot" ?⟜ "\\multimapinv" ?\⟦ "\\llbracket"
         ?\⟧ "\\rrbracket" ?\⟨ "\\langle" ?\⟩ "\\rangle" ?\⟪ "\\lang"
         ?\⟫ "\\rang" ?⟮ "\\lgroup" ?⟯ "\\rgroup" ?⟵ "\\longleftarrow"
         ?⟶ "\\longrightarrow" ?⟷ "\\longleftrightarrow" ?⟸ "\\Longleftarrow" ?⟹ "\\Longrightarrow"
         ?⟺ "\\Longleftrightarrow" ?⟻ "\\longmapsfrom" ?⟼ "\\longmapsto" ?⟽ "\\Longmapsfrom"
         ?⟾ "\\Longmapsto" ?⤀ "\\psur" ?⤆ "\\Mapsfrom" ?⤇ "\\Mapsto"
         ?⤒ "\\baruparrow" ?⤓ "\\downarrowbar" ?⤔ "\\pinj" ?⤕ "\\finj"
         ?⤖ "\\bij" ?⤳ "\\leadsto" ?⥊ "\\leftrightharpoon" ?⥋ "\\rightleftharpoon"
         ?⥎ "\\leftrightharpoonupup" ?⥏ "\\updownharpoonrightright" ?⥐ "\\leftrightharpoondowndown" ?⥑ "\\updownharpoonleftleft"
         ?⥒ "\\barleftharpoonup" ?⥓ "\\rightharpoonupbar" ?⥔ "\\barupharpoonright" ?⥕ "\\downharpoonrightbar"
         ?⥖ "\\barleftharpoondown" ?⥗ "\\rightharpoondownbar" ?⥘ "\\barupharpoonleft" ?⥙ "\\downharpoonleftbar"
         ?⥚ "\\leftharpoonupbar" ?⥛ "\\barrightharpoonup" ?⥜ "\\upharpoonrightbar" ?⥝ "\\bardownharpoonright"
         ?⥞ "\\leftharpoondownbar" ?⥟ "\\barrightharpoondown" ?⥠ "\\upharpoonleftbar" ?⥡ "\\bardownharpoonleft"
         ?⥢ "\\leftleftharpoons" ?⥣ "\\upupharpoons" ?⥤ "\\rightrightharpoons" ?⥥ "\\downdownharpoons"
         ?⥪ "\\leftbarharpoon" ?⥫ "\\barleftharpoon" ?⥬ "\\rightbarharpoon" ?⥭ "\\barrightharpoon"
         ?⥮ "\\updownharpoons" ?⥯ "\\downupharpoons" ?⥼ "\\strictfi" ?⥽ "\\strictif"
         ?⦀ "\\VERT" ?⦁ "\\spot" ?\⦅ "\\Lparen" ?\⦆ "\\Rparen"
         ?\⦇ "\\limg" ?\⦈ "\\rimg" ?\⦉ "\\lblot" ?\⦊ "\\rblot"
         ?⦸ "\\circledbslash" ?⧀ "\\circledless" ?⧁ "\\circledgtr" ?⧄ "\\boxslash"
         ?⧅ "\\boxbslash" ?⧆ "\\boxast" ?⧇ "\\boxcircle" ?⧈ "\\boxbox"
         ?⧏ "\\ltrivb" ?⧐ "\\vbrtri" ?⧟ "\\multimapboth" ?⧫ "\\blacklozenge"
         ?⧵ "\\setminus" ?⧹ "\\zhide" ?⨀ "\\bigodot" ?⨁ "\\bigoplus"
         ?⨂ "\\bigotimes" ?⨄ "\\biguplus" ?⨅ "\\bigsqcap" ?⨆ "\\bigsqcup"
         ?⨉ "\\varprod" ?⨌ "\\iiiint" ?⨏ "\\fint" ?⨖ "\\sqint"
         ?⨝ "\\Join" ?⨟ "\\zcmp" ?⨠ "\\zpipe" ?⨡ "\\zproject"
         ?⨾ "\\fcmp" ?⨿ "\\amalg" ?⩞ "\\doublebarwedge" ?⩤ "\\dsub"
         ?⩥ "\\rsub" ?⩴ "\\Coloneqq" ?⩵ "\\eqeq" ?⩶ "\\eqeqeq"
         ?⩽ "\\leqslant" ?⩾ "\\geqslant" ?⪅ "\\lessapprox" ?⪆ "\\gtrapprox"
         ?⪇ "\\lneq" ?⪈ "\\gneq" ?⪉ "\\lnapprox" ?⪊ "\\gnapprox"
         ?⪋ "\\lesseqqgtr" ?⪌ "\\gtreqqless" ?⪕ "\\eqslantless" ?⪖ "\\eqslantgtr"
         ?⪡ "\\Lt" ?⪢ "\\Gt" ?⪦ "\\leftslice" ?⪧ "\\rightslice"
         ?⪯ "\\preceq" ?⪰ "\\succeq" ?⪳ "\\preceqq" ?⪴ "\\succeqq"
         ?⪷ "\\precapprox" ?⪸ "\\succapprox" ?⪹ "\\precnapprox" ?⪺ "\\succnapprox"
         ?⪻ "\\llcurly" ?⪼ "\\ggcurly" ?⫅ "\\subseteqq" ?⫆ "\\supseteqq"
         ?⫋ "\\subsetneqq" ?⫌ "\\supsetneqq" ?⫪ "\\Top" ?⫫ "\\Bot"
         ?⫴ "\\interleave" ?⫼ "\\biginterleave" ?⫽ "\\sslash" ?⫾ "\\talloblong"
         ?⬛ "\\blacksquare" ?⬜ "\\square" ?𝐀 "\\mathbf{A}" ?𝐁 "\\mathbf{B}"
         ?𝐂 "\\mathbf{C}" ?𝐃 "\\mathbf{D}" ?𝐄 "\\mathbf{E}" ?𝐅 "\\mathbf{F}"
         ?𝐆 "\\mathbf{G}" ?𝐇 "\\mathbf{H}" ?𝐈 "\\mathbf{I}" ?𝐉 "\\mathbf{J}"
         ?𝐊 "\\mathbf{K}" ?𝐋 "\\mathbf{L}" ?𝐌 "\\mathbf{M}" ?𝐍 "\\mathbf{N}"
         ?𝐎 "\\mathbf{O}" ?𝐏 "\\mathbf{P}" ?𝐐 "\\mathbf{Q}" ?𝐑 "\\mathbf{R}"
         ?𝐒 "\\mathbf{S}" ?𝐓 "\\mathbf{T}" ?𝐔 "\\mathbf{U}" ?𝐕 "\\mathbf{V}"
         ?𝐖 "\\mathbf{W}" ?𝐗 "\\mathbf{X}" ?𝐘 "\\mathbf{Y}" ?𝐙 "\\mathbf{Z}"
         ?𝐚 "\\mathbf{a}" ?𝐛 "\\mathbf{b}" ?𝐜 "\\mathbf{c}" ?𝐝 "\\mathbf{d}"
         ?𝐞 "\\mathbf{e}" ?𝐟 "\\mathbf{f}" ?𝐠 "\\mathbf{g}" ?𝐡 "\\mathbf{h}"
         ?𝐢 "\\mathbf{i}" ?𝐣 "\\mathbf{j}" ?𝐤 "\\mathbf{k}" ?𝐥 "\\mathbf{l}"
         ?𝐦 "\\mathbf{m}" ?𝐧 "\\mathbf{n}" ?𝐨 "\\mathbf{o}" ?𝐩 "\\mathbf{p}"
         ?𝐪 "\\mathbf{q}" ?𝐫 "\\mathbf{r}" ?𝐬 "\\mathbf{s}" ?𝐭 "\\mathbf{t}"
         ?𝐮 "\\mathbf{u}" ?𝐯 "\\mathbf{v}" ?𝐰 "\\mathbf{w}" ?𝐱 "\\mathbf{x}"
         ?𝐲 "\\mathbf{y}" ?𝐳 "\\mathbf{z}" ?𝐴 "A" ?𝐵 "B"
         ?𝐶 "C" ?𝐷 "D" ?𝐸 "E" ?𝐹 "F"
         ?𝐺 "G" ?𝐻 "H" ?𝐼 "I" ?𝐽 "J"
         ?𝐾 "K" ?𝐿 "L" ?𝑀 "M" ?𝑁 "N"
         ?𝑂 "O" ?𝑃 "P" ?𝑄 "Q" ?𝑅 "R"
         ?𝑆 "S" ?𝑇 "T" ?𝑈 "U" ?𝑉 "V"
         ?𝑊 "W" ?𝑋 "X" ?𝑌 "Y" ?𝑍 "Z"
         ?𝑎 "a" ?𝑏 "b" ?𝑐 "c" ?𝑑 "d"
         ?𝑒 "e" ?𝑓 "f" ?𝑔 "g" ?𝑖 "i"
         ?𝑗 "j" ?𝑘 "k" ?𝑙 "l" ?𝑚 "m"
         ?𝑛 "n" ?𝑜 "o" ?𝑝 "p" ?𝑞 "q"
         ?𝑟 "r" ?𝑠 "s" ?𝑡 "t" ?𝑢 "u"
         ?𝑣 "v" ?𝑤 "w" ?𝑥 "x" ?𝑦 "y"
         ?𝑧 "z" ?𝑨 "\\mathbfit{A}" ?𝑩 "\\mathbfit{B}" ?𝑪 "\\mathbfit{C}"
         ?𝑫 "\\mathbfit{D}" ?𝑬 "\\mathbfit{E}" ?𝑭 "\\mathbfit{F}" ?𝑮 "\\mathbfit{G}"
         ?𝑯 "\\mathbfit{H}" ?𝑰 "\\mathbfit{I}" ?𝑱 "\\mathbfit{J}" ?𝑲 "\\mathbfit{K}"
         ?𝑳 "\\mathbfit{L}" ?𝑴 "\\mathbfit{M}" ?𝑵 "\\mathbfit{N}" ?𝑶 "\\mathbfit{O}"
         ?𝑷 "\\mathbfit{P}" ?𝑸 "\\mathbfit{Q}" ?𝑹 "\\mathbfit{R}" ?𝑺 "\\mathbfit{S}"
         ?𝑻 "\\mathbfit{T}" ?𝑼 "\\mathbfit{U}" ?𝑽 "\\mathbfit{V}" ?𝑾 "\\mathbfit{W}"
         ?𝑿 "\\mathbfit{X}" ?𝒀 "\\mathbfit{Y}" ?𝒁 "\\mathbfit{Z}" ?𝒂 "\\mathbfit{a}"
         ?𝒃 "\\mathbfit{b}" ?𝒄 "\\mathbfit{c}" ?𝒅 "\\mathbfit{d}" ?𝒆 "\\mathbfit{e}"
         ?𝒇 "\\mathbfit{f}" ?𝒈 "\\mathbfit{g}" ?𝒉 "\\mathbfit{h}" ?𝒊 "\\mathbfit{i}"
         ?𝒋 "\\mathbfit{j}" ?𝒌 "\\mathbfit{k}" ?𝒍 "\\mathbfit{l}" ?𝒎 "\\mathbfit{m}"
         ?𝒏 "\\mathbfit{n}" ?𝒐 "\\mathbfit{o}" ?𝒑 "\\mathbfit{p}" ?𝒒 "\\mathbfit{q}"
         ?𝒓 "\\mathbfit{r}" ?𝒔 "\\mathbfit{s}" ?𝒕 "\\mathbfit{t}" ?𝒖 "\\mathbfit{u}"
         ?𝒗 "\\mathbfit{v}" ?𝒘 "\\mathbfit{w}" ?𝒙 "\\mathbfit{x}" ?𝒚 "\\mathbfit{y}"
         ?𝒛 "\\mathbfit{z}" ?𝒜 "\\mathcal{A}" ?𝒞 "\\mathcal{C}" ?𝒟 "\\mathcal{D}"
         ?𝒢 "\\mathcal{G}" ?𝒥 "\\mathcal{J}" ?𝒦 "\\mathcal{K}" ?𝒩 "\\mathcal{N}"
         ?𝒪 "\\mathcal{O}" ?𝒫 "\\mathcal{P}" ?𝒬 "\\mathcal{Q}" ?𝒮 "\\mathcal{S}"
         ?𝒯 "\\mathcal{T}" ?𝒰 "\\mathcal{U}" ?𝒱 "\\mathcal{V}" ?𝒲 "\\mathcal{W}"
         ?𝒳 "\\mathcal{X}" ?𝒴 "\\mathcal{Y}" ?𝒵 "\\mathcal{Z}" ?𝒶 "\\mathcal{a}"
         ?𝒷 "\\mathcal{b}" ?𝒸 "\\mathcal{c}" ?𝒹 "\\mathcal{d}" ?𝒻 "\\mathcal{f}"
         ?𝒽 "\\mathcal{h}" ?𝒾 "\\mathcal{i}" ?𝒿 "\\mathcal{j}" ?𝓀 "\\mathcal{k}"
         ?𝓁 "\\mathcal{l}" ?𝓂 "\\mathcal{m}" ?𝓃 "\\mathcal{n}" ?𝓅 "\\mathcal{p}"
         ?𝓆 "\\mathcal{q}" ?𝓇 "\\mathcal{r}" ?𝓈 "\\mathcal{s}" ?𝓉 "\\mathcal{t}"
         ?𝓊 "\\mathcal{u}" ?𝓋 "\\mathcal{v}" ?𝓌 "\\mathcal{w}" ?𝓍 "\\mathcal{x}"
         ?𝓎 "\\mathcal{y}" ?𝓏 "\\mathcal{z}" ?𝔄 "\\mathfrak{A}" ?𝔅 "\\mathfrak{B}"
         ?𝔇 "\\mathfrak{D}" ?𝔈 "\\mathfrak{E}" ?𝔉 "\\mathfrak{F}" ?𝔊 "\\mathfrak{G}"
         ?𝔍 "\\mathfrak{J}" ?𝔎 "\\mathfrak{K}" ?𝔏 "\\mathfrak{L}" ?𝔐 "\\mathfrak{M}"
         ?𝔑 "\\mathfrak{N}" ?𝔒 "\\mathfrak{O}" ?𝔓 "\\mathfrak{P}" ?𝔔 "\\mathfrak{Q}"
         ?𝔖 "\\mathfrak{S}" ?𝔗 "\\mathfrak{T}" ?𝔘 "\\mathfrak{U}" ?𝔙 "\\mathfrak{V}"
         ?𝔚 "\\mathfrak{W}" ?𝔛 "\\mathfrak{X}" ?𝔜 "\\mathfrak{Y}" ?𝔞 "\\mathfrak{a}"
         ?𝔟 "\\mathfrak{b}" ?𝔠 "\\mathfrak{c}" ?𝔡 "\\mathfrak{d}" ?𝔢 "\\mathfrak{e}"
         ?𝔣 "\\mathfrak{f}" ?𝔤 "\\mathfrak{g}" ?𝔥 "\\mathfrak{h}" ?𝔦 "\\mathfrak{i}"
         ?𝔧 "\\mathfrak{j}" ?𝔨 "\\mathfrak{k}" ?𝔩 "\\mathfrak{l}" ?𝔪 "\\mathfrak{m}"
         ?𝔫 "\\mathfrak{n}" ?𝔬 "\\mathfrak{o}" ?𝔭 "\\mathfrak{p}" ?𝔮 "\\mathfrak{q}"
         ?𝔯 "\\mathfrak{r}" ?𝔰 "\\mathfrak{s}" ?𝔱 "\\mathfrak{t}" ?𝔲 "\\mathfrak{u}"
         ?𝔳 "\\mathfrak{v}" ?𝔴 "\\mathfrak{w}" ?𝔵 "\\mathfrak{x}" ?𝔶 "\\mathfrak{y}"
         ?𝔷 "\\mathfrak{z}" ?𝔸 "\\mathbb{A}" ?𝔹 "\\mathbb{B}" ?𝔻 "\\mathbb{D}"
         ?𝔼 "\\mathbb{E}" ?𝔽 "\\mathbb{F}" ?𝔾 "\\mathbb{G}" ?𝕀 "\\mathbb{I}"
         ?𝕁 "\\mathbb{J}" ?𝕂 "\\mathbb{K}" ?𝕃 "\\mathbb{L}" ?𝕄 "\\mathbb{M}"
         ?𝕆 "\\mathbb{O}" ?𝕊 "\\mathbb{S}" ?𝕋 "\\mathbb{T}" ?𝕌 "\\mathbb{U}"
         ?𝕍 "\\mathbb{V}" ?𝕎 "\\mathbb{W}" ?𝕏 "\\mathbb{X}" ?𝕐 "\\mathbb{Y}"
         ?𝕒 "\\mathbb{a}" ?𝕓 "\\mathbb{b}" ?𝕔 "\\mathbb{c}" ?𝕕 "\\mathbb{d}"
         ?𝕖 "\\mathbb{e}" ?𝕗 "\\mathbb{f}" ?𝕘 "\\mathbb{g}" ?𝕙 "\\mathbb{h}"
         ?𝕚 "\\mathbb{i}" ?𝕛 "\\mathbb{j}" ?𝕜 "\\mathbb{k}" ?𝕝 "\\mathbb{l}"
         ?𝕞 "\\mathbb{m}" ?𝕟 "\\mathbb{n}" ?𝕠 "\\mathbb{o}" ?𝕡 "\\mathbb{p}"
         ?𝕢 "\\mathbb{q}" ?𝕣 "\\mathbb{r}" ?𝕤 "\\mathbb{s}" ?𝕥 "\\mathbb{t}"
         ?𝕦 "\\mathbb{u}" ?𝕧 "\\mathbb{v}" ?𝕨 "\\mathbb{w}" ?𝕩 "\\mathbb{x}"
         ?𝕪 "\\mathbb{y}" ?𝕫 "\\mathbb{z}" ?𝖠 "\\mathsf{A}" ?𝖡 "\\mathsf{B}"
         ?𝖢 "\\mathsf{C}" ?𝖣 "\\mathsf{D}" ?𝖤 "\\mathsf{E}" ?𝖥 "\\mathsf{F}"
         ?𝖦 "\\mathsf{G}" ?𝖧 "\\mathsf{H}" ?𝖨 "\\mathsf{I}" ?𝖩 "\\mathsf{J}"
         ?𝖪 "\\mathsf{K}" ?𝖫 "\\mathsf{L}" ?𝖬 "\\mathsf{M}" ?𝖭 "\\mathsf{N}"
         ?𝖮 "\\mathsf{O}" ?𝖯 "\\mathsf{P}" ?𝖰 "\\mathsf{Q}" ?𝖱 "\\mathsf{R}"
         ?𝖲 "\\mathsf{S}" ?𝖳 "\\mathsf{T}" ?𝖴 "\\mathsf{U}" ?𝖵 "\\mathsf{V}"
         ?𝖶 "\\mathsf{W}" ?𝖷 "\\mathsf{X}" ?𝖸 "\\mathsf{Y}" ?𝖹 "\\mathsf{Z}"
         ?𝖺 "\\mathsf{a}" ?𝖻 "\\mathsf{b}" ?𝖼 "\\mathsf{c}" ?𝖽 "\\mathsf{d}"
         ?𝖾 "\\mathsf{e}" ?𝖿 "\\mathsf{f}" ?𝗀 "\\mathsf{g}" ?𝗁 "\\mathsf{h}"
         ?𝗂 "\\mathsf{i}" ?𝗃 "\\mathsf{j}" ?𝗄 "\\mathsf{k}" ?𝗅 "\\mathsf{l}"
         ?𝗆 "\\mathsf{m}" ?𝗇 "\\mathsf{n}" ?𝗈 "\\mathsf{o}" ?𝗉 "\\mathsf{p}"
         ?𝗊 "\\mathsf{q}" ?𝗋 "\\mathsf{r}" ?𝗌 "\\mathsf{s}" ?𝗍 "\\mathsf{t}"
         ?𝗎 "\\mathsf{u}" ?𝗏 "\\mathsf{v}" ?𝗐 "\\mathsf{w}" ?𝗑 "\\mathsf{x}"
         ?𝗒 "\\mathsf{y}" ?𝗓 "\\mathsf{z}" ?𝗔 "\\mathsfbf{A}" ?𝗕 "\\mathsfbf{B}"
         ?𝗖 "\\mathsfbf{C}" ?𝗗 "\\mathsfbf{D}" ?𝗘 "\\mathsfbf{E}" ?𝗙 "\\mathsfbf{F}"
         ?𝗚 "\\mathsfbf{G}" ?𝗛 "\\mathsfbf{H}" ?𝗜 "\\mathsfbf{I}" ?𝗝 "\\mathsfbf{J}"
         ?𝗞 "\\mathsfbf{K}" ?𝗟 "\\mathsfbf{L}" ?𝗠 "\\mathsfbf{M}" ?𝗡 "\\mathsfbf{N}"
         ?𝗢 "\\mathsfbf{O}" ?𝗣 "\\mathsfbf{P}" ?𝗤 "\\mathsfbf{Q}" ?𝗥 "\\mathsfbf{R}"
         ?𝗦 "\\mathsfbf{S}" ?𝗧 "\\mathsfbf{T}" ?𝗨 "\\mathsfbf{U}" ?𝗩 "\\mathsfbf{V}"
         ?𝗪 "\\mathsfbf{W}" ?𝗫 "\\mathsfbf{X}" ?𝗬 "\\mathsfbf{Y}" ?𝗭 "\\mathsfbf{Z}"
         ?𝗮 "\\mathsfbf{a}" ?𝗯 "\\mathsfbf{b}" ?𝗰 "\\mathsfbf{c}" ?𝗱 "\\mathsfbf{d}"
         ?𝗲 "\\mathsfbf{e}" ?𝗳 "\\mathsfbf{f}" ?𝗴 "\\mathsfbf{g}" ?𝗵 "\\mathsfbf{h}"
         ?𝗶 "\\mathsfbf{i}" ?𝗷 "\\mathsfbf{j}" ?𝗸 "\\mathsfbf{k}" ?𝗹 "\\mathsfbf{l}"
         ?𝗺 "\\mathsfbf{m}" ?𝗻 "\\mathsfbf{n}" ?𝗼 "\\mathsfbf{o}" ?𝗽 "\\mathsfbf{p}"
         ?𝗾 "\\mathsfbf{q}" ?𝗿 "\\mathsfbf{r}" ?𝘀 "\\mathsfbf{s}" ?𝘁 "\\mathsfbf{t}"
         ?𝘂 "\\mathsfbf{u}" ?𝘃 "\\mathsfbf{v}" ?𝘄 "\\mathsfbf{w}" ?𝘅 "\\mathsfbf{x}"
         ?𝘆 "\\mathsfbf{y}" ?𝘇 "\\mathsfbf{z}" ?𝘈 "\\mathsfit{A}" ?𝘉 "\\mathsfit{B}"
         ?𝘊 "\\mathsfit{C}" ?𝘋 "\\mathsfit{D}" ?𝘌 "\\mathsfit{E}" ?𝘍 "\\mathsfit{F}"
         ?𝘎 "\\mathsfit{G}" ?𝘏 "\\mathsfit{H}" ?𝘐 "\\mathsfit{I}" ?𝘑 "\\mathsfit{J}"
         ?𝘒 "\\mathsfit{K}" ?𝘓 "\\mathsfit{L}" ?𝘔 "\\mathsfit{M}" ?𝘕 "\\mathsfit{N}"
         ?𝘖 "\\mathsfit{O}" ?𝘗 "\\mathsfit{P}" ?𝘘 "\\mathsfit{Q}" ?𝘙 "\\mathsfit{R}"
         ?𝘚 "\\mathsfit{S}" ?𝘛 "\\mathsfit{T}" ?𝘜 "\\mathsfit{U}" ?𝘝 "\\mathsfit{V}"
         ?𝘞 "\\mathsfit{W}" ?𝘟 "\\mathsfit{X}" ?𝘠 "\\mathsfit{Y}" ?𝘡 "\\mathsfit{Z}"
         ?𝘢 "\\mathsfit{a}" ?𝘣 "\\mathsfit{b}" ?𝘤 "\\mathsfit{c}" ?𝘥 "\\mathsfit{d}"
         ?𝘦 "\\mathsfit{e}" ?𝘧 "\\mathsfit{f}" ?𝘨 "\\mathsfit{g}" ?𝘩 "\\mathsfit{h}"
         ?𝘪 "\\mathsfit{i}" ?𝘫 "\\mathsfit{j}" ?𝘬 "\\mathsfit{k}" ?𝘭 "\\mathsfit{l}"
         ?𝘮 "\\mathsfit{m}" ?𝘯 "\\mathsfit{n}" ?𝘰 "\\mathsfit{o}" ?𝘱 "\\mathsfit{p}"
         ?𝘲 "\\mathsfit{q}" ?𝘳 "\\mathsfit{r}" ?𝘴 "\\mathsfit{s}" ?𝘵 "\\mathsfit{t}"
         ?𝘶 "\\mathsfit{u}" ?𝘷 "\\mathsfit{v}" ?𝘸 "\\mathsfit{w}" ?𝘹 "\\mathsfit{x}"
         ?𝘺 "\\mathsfit{y}" ?𝘻 "\\mathsfit{z}" ?𝘼 "\\mathsfbfit{A}" ?𝘽 "\\mathsfbfit{B}"
         ?𝘾 "\\mathsfbfit{C}" ?𝘿 "\\mathsfbfit{D}" ?𝙀 "\\mathsfbfit{E}" ?𝙁 "\\mathsfbfit{F}"
         ?𝙂 "\\mathsfbfit{G}" ?𝙃 "\\mathsfbfit{H}" ?𝙄 "\\mathsfbfit{I}" ?𝙅 "\\mathsfbfit{J}"
         ?𝙆 "\\mathsfbfit{K}" ?𝙇 "\\mathsfbfit{L}" ?𝙈 "\\mathsfbfit{M}" ?𝙉 "\\mathsfbfit{N}"
         ?𝙊 "\\mathsfbfit{O}" ?𝙋 "\\mathsfbfit{P}" ?𝙌 "\\mathsfbfit{Q}" ?𝙍 "\\mathsfbfit{R}"
         ?𝙎 "\\mathsfbfit{S}" ?𝙏 "\\mathsfbfit{T}" ?𝙐 "\\mathsfbfit{U}" ?𝙑 "\\mathsfbfit{V}"
         ?𝙒 "\\mathsfbfit{W}" ?𝙓 "\\mathsfbfit{X}" ?𝙔 "\\mathsfbfit{Y}" ?𝙕 "\\mathsfbfit{Z}"
         ?𝙖 "\\mathsfbfit{a}" ?𝙗 "\\mathsfbfit{b}" ?𝙘 "\\mathsfbfit{c}" ?𝙙 "\\mathsfbfit{d}"
         ?𝙚 "\\mathsfbfit{e}" ?𝙛 "\\mathsfbfit{f}" ?𝙜 "\\mathsfbfit{g}" ?𝙝 "\\mathsfbfit{h}"
         ?𝙞 "\\mathsfbfit{i}" ?𝙟 "\\mathsfbfit{j}" ?𝙠 "\\mathsfbfit{k}" ?𝙡 "\\mathsfbfit{l}"
         ?𝙢 "\\mathsfbfit{m}" ?𝙣 "\\mathsfbfit{n}" ?𝙤 "\\mathsfbfit{o}" ?𝙥 "\\mathsfbfit{p}"
         ?𝙦 "\\mathsfbfit{q}" ?𝙧 "\\mathsfbfit{r}" ?𝙨 "\\mathsfbfit{s}" ?𝙩 "\\mathsfbfit{t}"
         ?𝙪 "\\mathsfbfit{u}" ?𝙫 "\\mathsfbfit{v}" ?𝙬 "\\mathsfbfit{w}" ?𝙭 "\\mathsfbfit{x}"
         ?𝙮 "\\mathsfbfit{y}" ?𝙯 "\\mathsfbfit{z}" ?𝙰 "\\mathtt{A}" ?𝙱 "\\mathtt{B}"
         ?𝙲 "\\mathtt{C}" ?𝙳 "\\mathtt{D}" ?𝙴 "\\mathtt{E}" ?𝙵 "\\mathtt{F}"
         ?𝙶 "\\mathtt{G}" ?𝙷 "\\mathtt{H}" ?𝙸 "\\mathtt{I}" ?𝙹 "\\mathtt{J}"
         ?𝙺 "\\mathtt{K}" ?𝙻 "\\mathtt{L}" ?𝙼 "\\mathtt{M}" ?𝙽 "\\mathtt{N}"
         ?𝙾 "\\mathtt{O}" ?𝙿 "\\mathtt{P}" ?𝚀 "\\mathtt{Q}" ?𝚁 "\\mathtt{R}"
         ?𝚂 "\\mathtt{S}" ?𝚃 "\\mathtt{T}" ?𝚄 "\\mathtt{U}" ?𝚅 "\\mathtt{V}"
         ?𝚆 "\\mathtt{W}" ?𝚇 "\\mathtt{X}" ?𝚈 "\\mathtt{Y}" ?𝚉 "\\mathtt{Z}"
         ?𝚊 "\\mathtt{a}" ?𝚋 "\\mathtt{b}" ?𝚌 "\\mathtt{c}" ?𝚍 "\\mathtt{d}"
         ?𝚎 "\\mathtt{e}" ?𝚏 "\\mathtt{f}" ?𝚐 "\\mathtt{g}" ?𝚑 "\\mathtt{h}"
         ?𝚒 "\\mathtt{i}" ?𝚓 "\\mathtt{j}" ?𝚔 "\\mathtt{k}" ?𝚕 "\\mathtt{l}"
         ?𝚖 "\\mathtt{m}" ?𝚗 "\\mathtt{n}" ?𝚘 "\\mathtt{o}" ?𝚙 "\\mathtt{p}"
         ?𝚚 "\\mathtt{q}" ?𝚛 "\\mathtt{r}" ?𝚜 "\\mathtt{s}" ?𝚝 "\\mathtt{t}"
         ?𝚞 "\\mathtt{u}" ?𝚟 "\\mathtt{v}" ?𝚠 "\\mathtt{w}" ?𝚡 "\\mathtt{x}"
         ?𝚢 "\\mathtt{y}" ?𝚣 "\\mathtt{z}" ?𝚤 "\\imath" ?𝚥 "\\jmath"
         ?𝚪 "\\mathbf{\\Gamma}" ?𝚫 "\\mathbf{\\Delta}" ?𝚯 "\\mathbf{\\Theta}" ?𝚲 "\\mathbf{\\Lambda}"
         ?𝚵 "\\mathbf{\\Xi}" ?𝚷 "\\mathbf{\\Pi}" ?𝚺 "\\mathbf{\\Sigma}" ?𝚼 "\\mathbf{\\Upsilon}"
         ?𝚽 "\\mathbf{\\Phi}" ?𝚿 "\\mathbf{\\Psi}" ?𝛀 "\\mathbf{\\Omega}" ?𝛂 "\\mathbf{\\alpha}"
         ?𝛃 "\\mathbf{\\beta}" ?𝛄 "\\mathbf{\\gamma}" ?𝛅 "\\mathbf{\\delta}" ?𝛆 "\\mathbf{\\varepsilon}"
         ?𝛇 "\\mathbf{\\zeta}" ?𝛈 "\\mathbf{\\eta}" ?𝛉 "\\mathbf{\\theta}" ?𝛊 "\\mathbf{\\iota}"
         ?𝛋 "\\mathbf{\\kappa}" ?𝛌 "\\mathbf{\\lambda}" ?𝛍 "\\mathbf{\\mu}" ?𝛎 "\\mathbf{\\nu}"
         ?𝛏 "\\mathbf{\\xi}" ?𝛑 "\\mathbf{\\pi}" ?𝛒 "\\mathbf{\\rho}" ?𝛓 "\\mathbf{\\varsigma}"
         ?𝛔 "\\mathbf{\\sigma}" ?𝛕 "\\mathbf{\\tau}" ?𝛖 "\\mathbf{\\upsilon}" ?𝛗 "\\mathbf{\\varphi}"
         ?𝛘 "\\mathbf{\\chi}" ?𝛙 "\\mathbf{\\psi}" ?𝛚 "\\mathbf{\\omega}" ?𝛜 "\\mathbf{\\epsilon}"
         ?𝛝 "\\mathbf{\\vartheta}" ?𝛟 "\\mathbf{\\phi}" ?𝛠 "\\mathbf{\\varrho}" ?𝛡 "\\mathbf{\\varpi}"
         ?𝛤 "\\Gamma" ?𝛥 "\\Delta" ?𝛩 "\\Theta" ?𝛬 "\\Lambda"
         ?𝛯 "\\Xi" ?𝛱 "\\Pi" ?𝛴 "\\Sigma" ?𝛶 "\\Upsilon"
         ?𝛷 "\\Phi" ?𝛹 "\\Psi" ?𝛺 "\\Omega" ?𝛼 "\\alpha"
         ?𝛽 "\\beta" ?𝛾 "\\gamma" ?𝛿 "\\delta" ?𝜀 "\\varepsilon"
         ?𝜁 "\\zeta" ?𝜂 "\\eta" ?𝜃 "\\theta" ?𝜄 "\\iota"
         ?𝜅 "\\kappa" ?𝜆 "\\lambda" ?𝜇 "\\mu" ?𝜈 "\\nu"
         ?𝜉 "\\xi" ?𝜋 "\\pi" ?𝜌 "\\rho" ?𝜍 "\\varsigma"
         ?𝜎 "\\sigma" ?𝜏 "\\tau" ?𝜐 "\\upsilon" ?𝜑 "\\varphi"
         ?𝜒 "\\chi" ?𝜓 "\\psi" ?𝜔 "\\omega" ?𝜕 "\\partial"
         ?𝜖 "\\epsilon" ?𝜗 "\\vartheta" ?𝜘 "\\varkappa" ?𝜙 "\\phi"
         ?𝜚 "\\varrho" ?𝜛 "\\varpi" ?𝜞 "\\mathbfit{\\Gamma}" ?𝜟 "\\mathbfit{\\Delta}"
         ?𝜣 "\\mathbfit{\\Theta}" ?𝜦 "\\mathbfit{\\Lambda}" ?𝜩 "\\mathbfit{\\Xi}" ?𝜫 "\\mathbfit{\\Pi}"
         ?𝜮 "\\mathbfit{\\Sigma}" ?𝜰 "\\mathbfit{\\Upsilon}" ?𝜱 "\\mathbfit{\\Phi}" ?𝜳 "\\mathbfit{\\Psi}"
         ?𝜴 "\\mathbfit{\\Omega}" ?𝜶 "\\mathbfit{\\alpha}" ?𝜷 "\\mathbfit{\\beta}" ?𝜸 "\\mathbfit{\\gamma}"
         ?𝜹 "\\mathbfit{\\delta}" ?𝜺 "\\mathbfit{\\varepsilon}" ?𝜻 "\\mathbfit{\\zeta}" ?𝜼 "\\mathbfit{\\eta}"
         ?𝜽 "\\mathbfit{\\theta}" ?𝜾 "\\mathbfit{\\iota}" ?𝜿 "\\mathbfit{\\kappa}" ?𝝀 "\\mathbfit{\\lambda}"
         ?𝝁 "\\mathbfit{\\mu}" ?𝝂 "\\mathbfit{\\nu}" ?𝝃 "\\mathbfit{\\xi}" ?𝝅 "\\mathbfit{\\pi}"
         ?𝝆 "\\mathbfit{\\rho}" ?𝝇 "\\mathbfit{\\varsigma}" ?𝝈 "\\mathbfit{\\sigma}" ?𝝉 "\\mathbfit{\\tau}"
         ?𝝊 "\\mathbfit{\\upsilon}" ?𝝋 "\\mathbfit{\\varphi}" ?𝝌 "\\mathbfit{\\chi}" ?𝝍 "\\mathbfit{\\psi}"
         ?𝝎 "\\mathbfit{\\omega}" ?𝝐 "\\mathbfit{\\epsilon}" ?𝝑 "\\mathbfit{\\vartheta}" ?𝝓 "\\mathbfit{\\phi}"
         ?𝝔 "\\mathbfit{\\varrho}" ?𝝕 "\\mathbfit{\\varpi}" ?𝝘 "\\mathsfbf{\\Gamma}" ?𝝙 "\\mathsfbf{\\Delta}"
         ?𝝝 "\\mathsfbf{\\Theta}" ?𝝠 "\\mathsfbf{\\Lambda}" ?𝝣 "\\mathsfbf{\\Xi}" ?𝝥 "\\mathsfbf{\\Pi}"
         ?𝝨 "\\mathsfbf{\\Sigma}" ?𝝪 "\\mathsfbf{\\Upsilon}" ?𝝫 "\\mathsfbf{\\Phi}" ?𝝭 "\\mathsfbf{\\Psi}"
         ?𝝮 "\\mathsfbf{\\Omega}" ?𝝰 "\\mathsfbf{\\alpha}" ?𝝱 "\\mathsfbf{\\beta}" ?𝝲 "\\mathsfbf{\\gamma}"
         ?𝝳 "\\mathsfbf{\\delta}" ?𝝴 "\\mathsfbf{\\varepsilon}" ?𝝵 "\\mathsfbf{\\zeta}" ?𝝶 "\\mathsfbf{\\eta}"
         ?𝝷 "\\mathsfbf{\\theta}" ?𝝸 "\\mathsfbf{\\iota}" ?𝝹 "\\mathsfbf{\\kappa}" ?𝝺 "\\mathsfbf{\\lambda}"
         ?𝝻 "\\mathsfbf{\\mu}" ?𝝼 "\\mathsfbf{\\nu}" ?𝝽 "\\mathsfbf{\\xi}" ?𝝿 "\\mathsfbf{\\pi}"
         ?𝞀 "\\mathsfbf{\\rho}" ?𝞁 "\\mathsfbf{\\varsigma}" ?𝞂 "\\mathsfbf{\\sigma}" ?𝞃 "\\mathsfbf{\\tau}"
         ?𝞄 "\\mathsfbf{\\upsilon}" ?𝞅 "\\mathsfbf{\\varphi}" ?𝞆 "\\mathsfbf{\\chi}" ?𝞇 "\\mathsfbf{\\psi}"
         ?𝞈 "\\mathsfbf{\\omega}" ?𝞊 "\\mathsfbf{\\epsilon}" ?𝞋 "\\mathsfbf{\\vartheta}" ?𝞍 "\\mathsfbf{\\phi}"
         ?𝞎 "\\mathsfbf{\\varrho}" ?𝞏 "\\mathsfbf{\\varpi}" ?𝞒 "\\mathsfbfit{\\Gamma}" ?𝞓 "\\mathsfbfit{\\Delta}"
         ?𝞗 "\\mathsfbfit{\\Theta}" ?𝞚 "\\mathsfbfit{\\Lambda}" ?𝞝 "\\mathsfbfit{\\Xi}" ?𝞟 "\\mathsfbfit{\\Pi}"
         ?𝞢 "\\mathsfbfit{\\Sigma}" ?𝞤 "\\mathsfbfit{\\Upsilon}" ?𝞥 "\\mathsfbfit{\\Phi}" ?𝞧 "\\mathsfbfit{\\Psi}"
         ?𝞨 "\\mathsfbfit{\\Omega}" ?𝞪 "\\mathsfbfit{\\alpha}" ?𝞫 "\\mathsfbfit{\\beta}" ?𝞬 "\\mathsfbfit{\\gamma}"
         ?𝞭 "\\mathsfbfit{\\delta}" ?𝞮 "\\mathsfbfit{\\varepsilon}" ?𝞯 "\\mathsfbfit{\\zeta}" ?𝞰 "\\mathsfbfit{\\eta}"
         ?𝞱 "\\mathsfbfit{\\theta}" ?𝞲 "\\mathsfbfit{\\iota}" ?𝞳 "\\mathsfbfit{\\kappa}" ?𝞴 "\\mathsfbfit{\\lambda}"
         ?𝞵 "\\mathsfbfit{\\mu}" ?𝞶 "\\mathsfbfit{\\nu}" ?𝞷 "\\mathsfbfit{\\xi}" ?𝞹 "\\mathsfbfit{\\pi}"
         ?𝞺 "\\mathsfbfit{\\rho}" ?𝞻 "\\mathsfbfit{\\varsigma}" ?𝞼 "\\mathsfbfit{\\sigma}" ?𝞽 "\\mathsfbfit{\\tau}"
         ?𝞾 "\\mathsfbfit{\\upsilon}" ?𝞿 "\\mathsfbfit{\\varphi}" ?𝟀 "\\mathsfbfit{\\chi}" ?𝟁 "\\mathsfbfit{\\psi}"
         ?𝟂 "\\mathsfbfit{\\omega}" ?𝟄 "\\mathsfbfit{\\epsilon}" ?𝟅 "\\mathsfbfit{\\vartheta}" ?𝟇 "\\mathsfbfit{\\phi}"
         ?𝟈 "\\mathsfbfit{\\varrho}" ?𝟉 "\\mathsfbfit{\\varpi}" ?𝟎 "\\mathbf{0}" ?𝟏 "\\mathbf{1}"
         ?𝟐 "\\mathbf{2}" ?𝟑 "\\mathbf{3}" ?𝟒 "\\mathbf{4}" ?𝟓 "\\mathbf{5}"
         ?𝟔 "\\mathbf{6}" ?𝟕 "\\mathbf{7}" ?𝟖 "\\mathbf{8}" ?𝟗 "\\mathbf{9}"
         ?𝟘 "\\mathbb{0}" ?𝟙 "\\mathbb{1}" ?𝟚 "\\mathbb{2}" ?𝟛 "\\mathbb{3}"
         ?𝟜 "\\mathbb{4}" ?𝟝 "\\mathbb{5}" ?𝟞 "\\mathbb{6}" ?𝟟 "\\mathbb{7}"
         ?𝟠 "\\mathbb{8}" ?𝟡 "\\mathbb{9}" ?𝟢 "\\mathsf{0}" ?𝟣 "\\mathsf{1}"
         ?𝟤 "\\mathsf{2}" ?𝟥 "\\mathsf{3}" ?𝟦 "\\mathsf{4}" ?𝟧 "\\mathsf{5}"
         ?𝟨 "\\mathsf{6}" ?𝟩 "\\mathsf{7}" ?𝟪 "\\mathsf{8}" ?𝟫 "\\mathsf{9}"
         ?𝟬 "\\mathsfbf{0}" ?𝟭 "\\mathsfbf{1}" ?𝟮 "\\mathsfbf{2}" ?𝟯 "\\mathsfbf{3}"
         ?𝟰 "\\mathsfbf{4}" ?𝟱 "\\mathsfbf{5}" ?𝟲 "\\mathsfbf{6}" ?𝟳 "\\mathsfbf{7}"
         ?𝟴 "\\mathsfbf{8}" ?𝟵 "\\mathsfbf{9}" ?𝟶 "\\mathtt{0}" ?𝟷 "\\mathtt{1}"
         ?𝟸 "\\mathtt{2}" ?𝟹 "\\mathtt{3}" ?𝟺 "\\mathtt{4}" ?𝟻 "\\mathtt{5}"
         ?𝟼 "\\mathtt{6}" ?𝟽 "\\mathtt{7}" ?𝟾 "\\mathtt{8}" ?𝟿 "\\mathtt{9}")))

(provide 'esh-latex-escape)
;;; esh-latex-escape.el ends here