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# encoding: utf-8
# DO NOT EDIT THIS FILE BY HAND.
# To update this file, run the script /tools/gen_latex_symbols.py using Python 3
# This file is autogenerated from the file:
# https://raw.githubusercontent.com/JuliaLang/julia/master/base/latex_symbols.jl
# This original list is filtered to remove any unicode characters that are not valid
# Python identifiers.
latex_symbols = {
" \\ euler " : " ℯ " ,
" \\ ^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 " ,
" \\ ^r " : " ʳ " ,
" \\ ^s " : " ˢ " ,
" \\ ^t " : " ᵗ " ,
" \\ ^u " : " ᵘ " ,
" \\ ^v " : " ᵛ " ,
" \\ ^w " : " ʷ " ,
" \\ ^x " : " ˣ " ,
" \\ ^y " : " ʸ " ,
" \\ ^z " : " ᶻ " ,
" \\ ^A " : " ᴬ " ,
" \\ ^B " : " ᴮ " ,
" \\ ^D " : " ᴰ " ,
" \\ ^E " : " ᴱ " ,
" \\ ^G " : " ᴳ " ,
" \\ ^H " : " ᴴ " ,
" \\ ^I " : " ᴵ " ,
" \\ ^J " : " ᴶ " ,
" \\ ^K " : " ᴷ " ,
" \\ ^L " : " ᴸ " ,
" \\ ^M " : " ᴹ " ,
" \\ ^N " : " ᴺ " ,
" \\ ^O " : " ᴼ " ,
" \\ ^P " : " ᴾ " ,
" \\ ^R " : " ᴿ " ,
" \\ ^T " : " ᵀ " ,
" \\ ^U " : " ᵁ " ,
" \\ ^V " : " ⱽ " ,
" \\ ^W " : " ᵂ " ,
" \\ ^alpha " : " ᵅ " ,
" \\ ^beta " : " ᵝ " ,
" \\ ^gamma " : " ᵞ " ,
" \\ ^delta " : " ᵟ " ,
" \\ ^epsilon " : " ᵋ " ,
" \\ ^theta " : " ᶿ " ,
" \\ ^iota " : " ᶥ " ,
" \\ ^phi " : " ᵠ " ,
" \\ ^chi " : " ᵡ " ,
" \\ ^Phi " : " ᶲ " ,
" \\ _a " : " ₐ " ,
" \\ _e " : " ₑ " ,
" \\ _h " : " ₕ " ,
" \\ _i " : " ᵢ " ,
" \\ _j " : " ⱼ " ,
" \\ _k " : " ₖ " ,
" \\ _l " : " ₗ " ,
" \\ _m " : " ₘ " ,
" \\ _n " : " ₙ " ,
" \\ _o " : " ₒ " ,
" \\ _p " : " ₚ " ,
" \\ _r " : " ᵣ " ,
" \\ _s " : " ₛ " ,
" \\ _t " : " ₜ " ,
" \\ _u " : " ᵤ " ,
" \\ _v " : " ᵥ " ,
" \\ _x " : " ₓ " ,
" \\ _schwa " : " ₔ " ,
" \\ _beta " : " ᵦ " ,
" \\ _gamma " : " ᵧ " ,
" \\ _rho " : " ᵨ " ,
" \\ _phi " : " ᵩ " ,
" \\ _chi " : " ᵪ " ,
" \\ hbar " : " ħ " ,
" \\ sout " : " ̶ " ,
" \\ ordfeminine " : " ª " ,
" \\ cdotp " : " · " ,
" \\ ordmasculine " : " º " ,
" \\ AA " : " Å " ,
" \\ AE " : " Æ " ,
" \\ DH " : " Ð " ,
" \\ O " : " Ø " ,
" \\ TH " : " Þ " ,
" \\ ss " : " ß " ,
" \\ aa " : " å " ,
" \\ ae " : " æ " ,
" \\ eth " : " ð " ,
" \\ dh " : " ð " ,
" \\ o " : " ø " ,
" \\ th " : " þ " ,
" \\ DJ " : " Đ " ,
" \\ dj " : " đ " ,
" \\ imath " : " ı " ,
" \\ jmath " : " ȷ " ,
" \\ L " : " Ł " ,
" \\ l " : " ł " ,
" \\ NG " : " Ŋ " ,
" \\ ng " : " ŋ " ,
" \\ OE " : " Œ " ,
" \\ oe " : " œ " ,
" \\ hvlig " : " ƕ " ,
" \\ nrleg " : " ƞ " ,
" \\ doublepipe " : " ǂ " ,
" \\ trna " : " ɐ " ,
" \\ trnsa " : " ɒ " ,
" \\ openo " : " ɔ " ,
" \\ rtld " : " ɖ " ,
" \\ schwa " : " ə " ,
" \\ varepsilon " : " ε " ,
" \\ pgamma " : " ɣ " ,
" \\ pbgam " : " ɤ " ,
" \\ trnh " : " ɥ " ,
" \\ btdl " : " ɬ " ,
" \\ rtll " : " ɭ " ,
" \\ trnm " : " ɯ " ,
" \\ trnmlr " : " ɰ " ,
" \\ ltlmr " : " ɱ " ,
" \\ ltln " : " ɲ " ,
" \\ rtln " : " ɳ " ,
" \\ clomeg " : " ɷ " ,
" \\ ltphi " : " ɸ " ,
" \\ trnr " : " ɹ " ,
" \\ trnrl " : " ɺ " ,
" \\ rttrnr " : " ɻ " ,
" \\ rl " : " ɼ " ,
" \\ rtlr " : " ɽ " ,
" \\ fhr " : " ɾ " ,
" \\ rtls " : " ʂ " ,
" \\ esh " : " ʃ " ,
" \\ trnt " : " ʇ " ,
" \\ rtlt " : " ʈ " ,
" \\ pupsil " : " ʊ " ,
" \\ pscrv " : " ʋ " ,
" \\ invv " : " ʌ " ,
" \\ invw " : " ʍ " ,
" \\ trny " : " ʎ " ,
" \\ rtlz " : " ʐ " ,
" \\ yogh " : " ʒ " ,
" \\ glst " : " ʔ " ,
" \\ reglst " : " ʕ " ,
" \\ inglst " : " ʖ " ,
" \\ turnk " : " ʞ " ,
" \\ dyogh " : " ʤ " ,
" \\ tesh " : " ʧ " ,
" \\ rasp " : " ʼ " ,
" \\ verts " : " ˈ " ,
" \\ verti " : " ˌ " ,
" \\ lmrk " : " ː " ,
" \\ hlmrk " : " ˑ " ,
" \\ grave " : " ̀ " ,
" \\ acute " : " ́ " ,
" \\ hat " : " ̂ " ,
" \\ tilde " : " ̃ " ,
" \\ bar " : " ̄ " ,
" \\ breve " : " ̆ " ,
" \\ dot " : " ̇ " ,
" \\ ddot " : " ̈ " ,
" \\ ocirc " : " ̊ " ,
" \\ H " : " ̋ " ,
" \\ check " : " ̌ " ,
" \\ palh " : " ̡ " ,
" \\ rh " : " ̢ " ,
" \\ c " : " ̧ " ,
" \\ k " : " ̨ " ,
" \\ sbbrg " : " ̪ " ,
" \\ strike " : " ̶ " ,
" \\ Alpha " : " Α " ,
" \\ Beta " : " Β " ,
" \\ Gamma " : " Γ " ,
" \\ Delta " : " Δ " ,
" \\ Epsilon " : " Ε " ,
" \\ Zeta " : " Ζ " ,
" \\ Eta " : " Η " ,
" \\ Theta " : " Θ " ,
" \\ Iota " : " Ι " ,
" \\ Kappa " : " Κ " ,
" \\ Lambda " : " Λ " ,
" \\ Xi " : " Ξ " ,
" \\ Pi " : " Π " ,
" \\ Rho " : " Ρ " ,
" \\ Sigma " : " Σ " ,
" \\ Tau " : " Τ " ,
" \\ Upsilon " : " Υ " ,
" \\ Phi " : " Φ " ,
" \\ Chi " : " Χ " ,
" \\ Psi " : " Ψ " ,
" \\ Omega " : " Ω " ,
" \\ alpha " : " α " ,
" \\ beta " : " β " ,
" \\ gamma " : " γ " ,
" \\ delta " : " δ " ,
" \\ zeta " : " ζ " ,
" \\ eta " : " η " ,
" \\ theta " : " θ " ,
" \\ iota " : " ι " ,
" \\ kappa " : " κ " ,
" \\ lambda " : " λ " ,
" \\ mu " : " μ " ,
" \\ nu " : " ν " ,
" \\ xi " : " ξ " ,
" \\ pi " : " π " ,
" \\ rho " : " ρ " ,
" \\ varsigma " : " ς " ,
" \\ sigma " : " σ " ,
" \\ tau " : " τ " ,
" \\ upsilon " : " υ " ,
" \\ varphi " : " φ " ,
" \\ chi " : " χ " ,
" \\ psi " : " ψ " ,
" \\ omega " : " ω " ,
" \\ vartheta " : " ϑ " ,
" \\ phi " : " ϕ " ,
" \\ varpi " : " ϖ " ,
" \\ Stigma " : " Ϛ " ,
" \\ Digamma " : " Ϝ " ,
" \\ digamma " : " ϝ " ,
" \\ Koppa " : " Ϟ " ,
" \\ Sampi " : " Ϡ " ,
" \\ varkappa " : " ϰ " ,
" \\ varrho " : " ϱ " ,
" \\ varTheta " : " ϴ " ,
" \\ epsilon " : " ϵ " ,
" \\ dddot " : " ⃛ " ,
" \\ ddddot " : " ⃜ " ,
" \\ hslash " : " ℏ " ,
" \\ Im " : " ℑ " ,
" \\ ell " : " ℓ " ,
" \\ wp " : " ℘ " ,
" \\ Re " : " ℜ " ,
" \\ aleph " : " ℵ " ,
" \\ beth " : " ℶ " ,
" \\ gimel " : " ℷ " ,
" \\ daleth " : " ℸ " ,
" \\ bbPi " : " ℿ " ,
" \\ Zbar " : " Ƶ " ,
" \\ overbar " : " ̅ " ,
" \\ ovhook " : " ̉ " ,
" \\ candra " : " ̐ " ,
" \\ oturnedcomma " : " ̒ " ,
" \\ ocommatopright " : " ̕ " ,
" \\ droang " : " ̚ " ,
" \\ wideutilde " : " ̰ " ,
" \\ not " : " ̸ " ,
" \\ upMu " : " Μ " ,
" \\ upNu " : " Ν " ,
" \\ upOmicron " : " Ο " ,
" \\ upepsilon " : " ε " ,
" \\ upomicron " : " ο " ,
" \\ upvarbeta " : " ϐ " ,
" \\ upoldKoppa " : " Ϙ " ,
" \\ upoldkoppa " : " ϙ " ,
" \\ upstigma " : " ϛ " ,
" \\ upkoppa " : " ϟ " ,
" \\ upsampi " : " ϡ " ,
" \\ tieconcat " : " ⁀ " ,
" \\ leftharpoonaccent " : " ⃐ " ,
" \\ rightharpoonaccent " : " ⃑ " ,
" \\ vertoverlay " : " ⃒ " ,
" \\ overleftarrow " : " ⃖ " ,
" \\ vec " : " ⃗ " ,
" \\ overleftrightarrow " : " ⃡ " ,
" \\ annuity " : " ⃧ " ,
" \\ threeunderdot " : " ⃨ " ,
" \\ widebridgeabove " : " ⃩ " ,
" \\ bbC " : " ℂ " ,
" \\ eulermascheroni " : " ℇ " ,
" \\ scrg " : " ℊ " ,
" \\ scrH " : " ℋ " ,
" \\ frakH " : " ℌ " ,
" \\ bbH " : " ℍ " ,
" \\ planck " : " ℎ " ,
" \\ scrI " : " ℐ " ,
" \\ scrL " : " ℒ " ,
" \\ bbN " : " ℕ " ,
" \\ bbP " : " ℙ " ,
" \\ bbQ " : " ℚ " ,
" \\ scrR " : " ℛ " ,
" \\ bbR " : " ℝ " ,
" \\ bbZ " : " ℤ " ,
" \\ frakZ " : " ℨ " ,
" \\ Angstrom " : " Å " ,
" \\ scrB " : " ℬ " ,
" \\ frakC " : " ℭ " ,
" \\ scre " : " ℯ " ,
" \\ scrE " : " ℰ " ,
" \\ scrF " : " ℱ " ,
" \\ Finv " : " Ⅎ " ,
" \\ scrM " : " ℳ " ,
" \\ scro " : " ℴ " ,
" \\ bbgamma " : " ℽ " ,
" \\ bbGamma " : " ℾ " ,
" \\ bbiD " : " ⅅ " ,
" \\ bbid " : " ⅆ " ,
" \\ bbie " : " ⅇ " ,
" \\ bbii " : " ⅈ " ,
" \\ bbij " : " ⅉ " ,
" \\ bfA " : " 𝐀 " ,
" \\ bfB " : " 𝐁 " ,
" \\ bfC " : " 𝐂 " ,
" \\ bfD " : " 𝐃 " ,
" \\ bfE " : " 𝐄 " ,
" \\ bfF " : " 𝐅 " ,
" \\ bfG " : " 𝐆 " ,
" \\ bfH " : " 𝐇 " ,
" \\ bfI " : " 𝐈 " ,
" \\ bfJ " : " 𝐉 " ,
" \\ bfK " : " 𝐊 " ,
" \\ bfL " : " 𝐋 " ,
" \\ bfM " : " 𝐌 " ,
" \\ bfN " : " 𝐍 " ,
" \\ bfO " : " 𝐎 " ,
" \\ bfP " : " 𝐏 " ,
" \\ bfQ " : " 𝐐 " ,
" \\ bfR " : " 𝐑 " ,
" \\ bfS " : " 𝐒 " ,
" \\ bfT " : " 𝐓 " ,
" \\ bfU " : " 𝐔 " ,
" \\ bfV " : " 𝐕 " ,
" \\ bfW " : " 𝐖 " ,
" \\ bfX " : " 𝐗 " ,
" \\ bfY " : " 𝐘 " ,
" \\ bfZ " : " 𝐙 " ,
" \\ bfa " : " 𝐚 " ,
" \\ bfb " : " 𝐛 " ,
" \\ bfc " : " 𝐜 " ,
" \\ bfd " : " 𝐝 " ,
" \\ bfe " : " 𝐞 " ,
" \\ bff " : " 𝐟 " ,
" \\ bfg " : " 𝐠 " ,
" \\ bfh " : " 𝐡 " ,
" \\ bfi " : " 𝐢 " ,
" \\ bfj " : " 𝐣 " ,
" \\ bfk " : " 𝐤 " ,
" \\ bfl " : " 𝐥 " ,
" \\ bfm " : " 𝐦 " ,
" \\ bfn " : " 𝐧 " ,
" \\ bfo " : " 𝐨 " ,
" \\ bfp " : " 𝐩 " ,
" \\ bfq " : " 𝐪 " ,
" \\ bfr " : " 𝐫 " ,
" \\ bfs " : " 𝐬 " ,
" \\ bft " : " 𝐭 " ,
" \\ bfu " : " 𝐮 " ,
" \\ bfv " : " 𝐯 " ,
" \\ bfw " : " 𝐰 " ,
" \\ bfx " : " 𝐱 " ,
" \\ bfy " : " 𝐲 " ,
" \\ bfz " : " 𝐳 " ,
" \\ itA " : " 𝐴 " ,
" \\ itB " : " 𝐵 " ,
" \\ itC " : " 𝐶 " ,
" \\ itD " : " 𝐷 " ,
" \\ itE " : " 𝐸 " ,
" \\ itF " : " 𝐹 " ,
" \\ itG " : " 𝐺 " ,
" \\ itH " : " 𝐻 " ,
" \\ itI " : " 𝐼 " ,
" \\ itJ " : " 𝐽 " ,
" \\ itK " : " 𝐾 " ,
" \\ itL " : " 𝐿 " ,
" \\ itM " : " 𝑀 " ,
" \\ itN " : " 𝑁 " ,
" \\ itO " : " 𝑂 " ,
" \\ itP " : " 𝑃 " ,
" \\ itQ " : " 𝑄 " ,
" \\ itR " : " 𝑅 " ,
" \\ itS " : " 𝑆 " ,
" \\ itT " : " 𝑇 " ,
" \\ itU " : " 𝑈 " ,
" \\ itV " : " 𝑉 " ,
" \\ itW " : " 𝑊 " ,
" \\ itX " : " 𝑋 " ,
" \\ itY " : " 𝑌 " ,
" \\ itZ " : " 𝑍 " ,
" \\ ita " : " 𝑎 " ,
" \\ itb " : " 𝑏 " ,
" \\ itc " : " 𝑐 " ,
" \\ itd " : " 𝑑 " ,
" \\ ite " : " 𝑒 " ,
" \\ itf " : " 𝑓 " ,
" \\ itg " : " 𝑔 " ,
" \\ iti " : " 𝑖 " ,
" \\ itj " : " 𝑗 " ,
" \\ itk " : " 𝑘 " ,
" \\ itl " : " 𝑙 " ,
" \\ itm " : " 𝑚 " ,
" \\ itn " : " 𝑛 " ,
" \\ ito " : " 𝑜 " ,
" \\ itp " : " 𝑝 " ,
" \\ itq " : " 𝑞 " ,
" \\ itr " : " 𝑟 " ,
" \\ its " : " 𝑠 " ,
" \\ itt " : " 𝑡 " ,
" \\ itu " : " 𝑢 " ,
" \\ itv " : " 𝑣 " ,
" \\ itw " : " 𝑤 " ,
" \\ itx " : " 𝑥 " ,
" \\ ity " : " 𝑦 " ,
" \\ itz " : " 𝑧 " ,
" \\ biA " : " 𝑨 " ,
" \\ biB " : " 𝑩 " ,
" \\ biC " : " 𝑪 " ,
" \\ biD " : " 𝑫 " ,
" \\ biE " : " 𝑬 " ,
" \\ biF " : " 𝑭 " ,
" \\ biG " : " 𝑮 " ,
" \\ biH " : " 𝑯 " ,
" \\ biI " : " 𝑰 " ,
" \\ biJ " : " 𝑱 " ,
" \\ biK " : " 𝑲 " ,
" \\ biL " : " 𝑳 " ,
" \\ biM " : " 𝑴 " ,
" \\ biN " : " 𝑵 " ,
" \\ biO " : " 𝑶 " ,
" \\ biP " : " 𝑷 " ,
" \\ biQ " : " 𝑸 " ,
" \\ biR " : " 𝑹 " ,
" \\ biS " : " 𝑺 " ,
" \\ biT " : " 𝑻 " ,
" \\ biU " : " 𝑼 " ,
" \\ biV " : " 𝑽 " ,
" \\ biW " : " 𝑾 " ,
" \\ biX " : " 𝑿 " ,
" \\ biY " : " 𝒀 " ,
" \\ biZ " : " 𝒁 " ,
" \\ bia " : " 𝒂 " ,
" \\ bib " : " 𝒃 " ,
" \\ bic " : " 𝒄 " ,
" \\ bid " : " 𝒅 " ,
" \\ bie " : " 𝒆 " ,
" \\ bif " : " 𝒇 " ,
" \\ big " : " 𝒈 " ,
" \\ bih " : " 𝒉 " ,
" \\ bii " : " 𝒊 " ,
" \\ bij " : " 𝒋 " ,
" \\ bik " : " 𝒌 " ,
" \\ bil " : " 𝒍 " ,
" \\ bim " : " 𝒎 " ,
" \\ bin " : " 𝒏 " ,
" \\ bio " : " 𝒐 " ,
" \\ bip " : " 𝒑 " ,
" \\ biq " : " 𝒒 " ,
" \\ bir " : " 𝒓 " ,
" \\ bis " : " 𝒔 " ,
" \\ bit " : " 𝒕 " ,
" \\ biu " : " 𝒖 " ,
" \\ biv " : " 𝒗 " ,
" \\ biw " : " 𝒘 " ,
" \\ bix " : " 𝒙 " ,
" \\ biy " : " 𝒚 " ,
" \\ biz " : " 𝒛 " ,
" \\ scrA " : " 𝒜 " ,
" \\ scrC " : " 𝒞 " ,
" \\ scrD " : " 𝒟 " ,
" \\ scrG " : " 𝒢 " ,
" \\ scrJ " : " 𝒥 " ,
" \\ scrK " : " 𝒦 " ,
" \\ scrN " : " 𝒩 " ,
" \\ scrO " : " 𝒪 " ,
" \\ scrP " : " 𝒫 " ,
" \\ scrQ " : " 𝒬 " ,
" \\ scrS " : " 𝒮 " ,
" \\ scrT " : " 𝒯 " ,
" \\ scrU " : " 𝒰 " ,
" \\ scrV " : " 𝒱 " ,
" \\ scrW " : " 𝒲 " ,
" \\ scrX " : " 𝒳 " ,
" \\ scrY " : " 𝒴 " ,
" \\ scrZ " : " 𝒵 " ,
" \\ scra " : " 𝒶 " ,
" \\ scrb " : " 𝒷 " ,
" \\ scrc " : " 𝒸 " ,
" \\ scrd " : " 𝒹 " ,
" \\ scrf " : " 𝒻 " ,
" \\ scrh " : " 𝒽 " ,
" \\ scri " : " 𝒾 " ,
" \\ scrj " : " 𝒿 " ,
" \\ scrk " : " 𝓀 " ,
" \\ scrm " : " 𝓂 " ,
" \\ scrn " : " 𝓃 " ,
" \\ scrp " : " 𝓅 " ,
" \\ scrq " : " 𝓆 " ,
" \\ scrr " : " 𝓇 " ,
" \\ scrs " : " 𝓈 " ,
" \\ scrt " : " 𝓉 " ,
" \\ scru " : " 𝓊 " ,
" \\ scrv " : " 𝓋 " ,
" \\ scrw " : " 𝓌 " ,
" \\ scrx " : " 𝓍 " ,
" \\ scry " : " 𝓎 " ,
" \\ scrz " : " 𝓏 " ,
" \\ bscrA " : " 𝓐 " ,
" \\ bscrB " : " 𝓑 " ,
" \\ bscrC " : " 𝓒 " ,
" \\ bscrD " : " 𝓓 " ,
" \\ bscrE " : " 𝓔 " ,
" \\ bscrF " : " 𝓕 " ,
" \\ bscrG " : " 𝓖 " ,
" \\ bscrH " : " 𝓗 " ,
" \\ bscrI " : " 𝓘 " ,
" \\ bscrJ " : " 𝓙 " ,
" \\ bscrK " : " 𝓚 " ,
" \\ bscrL " : " 𝓛 " ,
" \\ bscrM " : " 𝓜 " ,
" \\ bscrN " : " 𝓝 " ,
" \\ bscrO " : " 𝓞 " ,
" \\ bscrP " : " 𝓟 " ,
" \\ bscrQ " : " 𝓠 " ,
" \\ bscrR " : " 𝓡 " ,
" \\ bscrS " : " 𝓢 " ,
" \\ bscrT " : " 𝓣 " ,
" \\ bscrU " : " 𝓤 " ,
" \\ bscrV " : " 𝓥 " ,
" \\ bscrW " : " 𝓦 " ,
" \\ bscrX " : " 𝓧 " ,
" \\ bscrY " : " 𝓨 " ,
" \\ bscrZ " : " 𝓩 " ,
" \\ bscra " : " 𝓪 " ,
" \\ bscrb " : " 𝓫 " ,
" \\ bscrc " : " 𝓬 " ,
" \\ bscrd " : " 𝓭 " ,
" \\ bscre " : " 𝓮 " ,
" \\ bscrf " : " 𝓯 " ,
" \\ bscrg " : " 𝓰 " ,
" \\ bscrh " : " 𝓱 " ,
" \\ bscri " : " 𝓲 " ,
" \\ bscrj " : " 𝓳 " ,
" \\ bscrk " : " 𝓴 " ,
" \\ bscrl " : " 𝓵 " ,
" \\ bscrm " : " 𝓶 " ,
" \\ bscrn " : " 𝓷 " ,
" \\ bscro " : " 𝓸 " ,
" \\ bscrp " : " 𝓹 " ,
" \\ bscrq " : " 𝓺 " ,
" \\ bscrr " : " 𝓻 " ,
" \\ bscrs " : " 𝓼 " ,
" \\ bscrt " : " 𝓽 " ,
" \\ bscru " : " 𝓾 " ,
" \\ bscrv " : " 𝓿 " ,
" \\ bscrw " : " 𝔀 " ,
" \\ bscrx " : " 𝔁 " ,
" \\ bscry " : " 𝔂 " ,
" \\ bscrz " : " 𝔃 " ,
" \\ frakA " : " 𝔄 " ,
" \\ frakB " : " 𝔅 " ,
" \\ frakD " : " 𝔇 " ,
" \\ frakE " : " 𝔈 " ,
" \\ frakF " : " 𝔉 " ,
" \\ frakG " : " 𝔊 " ,
" \\ frakJ " : " 𝔍 " ,
" \\ frakK " : " 𝔎 " ,
" \\ frakL " : " 𝔏 " ,
" \\ frakM " : " 𝔐 " ,
" \\ frakN " : " 𝔑 " ,
" \\ frakO " : " 𝔒 " ,
" \\ frakP " : " 𝔓 " ,
" \\ frakQ " : " 𝔔 " ,
" \\ frakS " : " 𝔖 " ,
" \\ frakT " : " 𝔗 " ,
" \\ frakU " : " 𝔘 " ,
" \\ frakV " : " 𝔙 " ,
" \\ frakW " : " 𝔚 " ,
" \\ frakX " : " 𝔛 " ,
" \\ frakY " : " 𝔜 " ,
" \\ fraka " : " 𝔞 " ,
" \\ frakb " : " 𝔟 " ,
" \\ frakc " : " 𝔠 " ,
" \\ frakd " : " 𝔡 " ,
" \\ frake " : " 𝔢 " ,
" \\ frakf " : " 𝔣 " ,
" \\ frakg " : " 𝔤 " ,
" \\ frakh " : " 𝔥 " ,
" \\ fraki " : " 𝔦 " ,
" \\ frakj " : " 𝔧 " ,
" \\ frakk " : " 𝔨 " ,
" \\ frakl " : " 𝔩 " ,
" \\ frakm " : " 𝔪 " ,
" \\ frakn " : " 𝔫 " ,
" \\ frako " : " 𝔬 " ,
" \\ frakp " : " 𝔭 " ,
" \\ frakq " : " 𝔮 " ,
" \\ frakr " : " 𝔯 " ,
" \\ fraks " : " 𝔰 " ,
" \\ frakt " : " 𝔱 " ,
" \\ fraku " : " 𝔲 " ,
" \\ frakv " : " 𝔳 " ,
" \\ frakw " : " 𝔴 " ,
" \\ frakx " : " 𝔵 " ,
" \\ fraky " : " 𝔶 " ,
" \\ frakz " : " 𝔷 " ,
" \\ bbA " : " 𝔸 " ,
" \\ bbB " : " 𝔹 " ,
" \\ bbD " : " 𝔻 " ,
" \\ bbE " : " 𝔼 " ,
" \\ bbF " : " 𝔽 " ,
" \\ bbG " : " 𝔾 " ,
" \\ bbI " : " 𝕀 " ,
" \\ bbJ " : " 𝕁 " ,
" \\ bbK " : " 𝕂 " ,
" \\ bbL " : " 𝕃 " ,
" \\ bbM " : " 𝕄 " ,
" \\ bbO " : " 𝕆 " ,
" \\ bbS " : " 𝕊 " ,
" \\ bbT " : " 𝕋 " ,
" \\ bbU " : " 𝕌 " ,
" \\ bbV " : " 𝕍 " ,
" \\ bbW " : " 𝕎 " ,
" \\ bbX " : " 𝕏 " ,
" \\ bbY " : " 𝕐 " ,
" \\ bba " : " 𝕒 " ,
" \\ bbb " : " 𝕓 " ,
" \\ bbc " : " 𝕔 " ,
" \\ bbd " : " 𝕕 " ,
" \\ bbe " : " 𝕖 " ,
" \\ bbf " : " 𝕗 " ,
" \\ bbg " : " 𝕘 " ,
" \\ bbh " : " 𝕙 " ,
" \\ bbi " : " 𝕚 " ,
" \\ bbj " : " 𝕛 " ,
" \\ bbk " : " 𝕜 " ,
" \\ bbl " : " 𝕝 " ,
" \\ bbm " : " 𝕞 " ,
" \\ bbn " : " 𝕟 " ,
" \\ bbo " : " 𝕠 " ,
" \\ bbp " : " 𝕡 " ,
" \\ bbq " : " 𝕢 " ,
" \\ bbr " : " 𝕣 " ,
" \\ bbs " : " 𝕤 " ,
" \\ bbt " : " 𝕥 " ,
" \\ bbu " : " 𝕦 " ,
" \\ bbv " : " 𝕧 " ,
" \\ bbw " : " 𝕨 " ,
" \\ bbx " : " 𝕩 " ,
" \\ bby " : " 𝕪 " ,
" \\ bbz " : " 𝕫 " ,
" \\ bfrakA " : " 𝕬 " ,
" \\ bfrakB " : " 𝕭 " ,
" \\ bfrakC " : " 𝕮 " ,
" \\ bfrakD " : " 𝕯 " ,
" \\ bfrakE " : " 𝕰 " ,
" \\ bfrakF " : " 𝕱 " ,
" \\ bfrakG " : " 𝕲 " ,
" \\ bfrakH " : " 𝕳 " ,
" \\ bfrakI " : " 𝕴 " ,
" \\ bfrakJ " : " 𝕵 " ,
" \\ bfrakK " : " 𝕶 " ,
" \\ bfrakL " : " 𝕷 " ,
" \\ bfrakM " : " 𝕸 " ,
" \\ bfrakN " : " 𝕹 " ,
" \\ bfrakO " : " 𝕺 " ,
" \\ bfrakP " : " 𝕻 " ,
" \\ bfrakQ " : " 𝕼 " ,
" \\ bfrakR " : " 𝕽 " ,
" \\ bfrakS " : " 𝕾 " ,
" \\ bfrakT " : " 𝕿 " ,
" \\ bfrakU " : " 𝖀 " ,
" \\ bfrakV " : " 𝖁 " ,
" \\ bfrakW " : " 𝖂 " ,
" \\ bfrakX " : " 𝖃 " ,
" \\ bfrakY " : " 𝖄 " ,
" \\ bfrakZ " : " 𝖅 " ,
" \\ bfraka " : " 𝖆 " ,
" \\ bfrakb " : " 𝖇 " ,
" \\ bfrakc " : " 𝖈 " ,
" \\ bfrakd " : " 𝖉 " ,
" \\ bfrake " : " 𝖊 " ,
" \\ bfrakf " : " 𝖋 " ,
" \\ bfrakg " : " 𝖌 " ,
" \\ bfrakh " : " 𝖍 " ,
" \\ bfraki " : " 𝖎 " ,
" \\ bfrakj " : " 𝖏 " ,
" \\ bfrakk " : " 𝖐 " ,
" \\ bfrakl " : " 𝖑 " ,
" \\ bfrakm " : " 𝖒 " ,
" \\ bfrakn " : " 𝖓 " ,
" \\ bfrako " : " 𝖔 " ,
" \\ bfrakp " : " 𝖕 " ,
" \\ bfrakq " : " 𝖖 " ,
" \\ bfrakr " : " 𝖗 " ,
" \\ bfraks " : " 𝖘 " ,
" \\ bfrakt " : " 𝖙 " ,
" \\ bfraku " : " 𝖚 " ,
" \\ bfrakv " : " 𝖛 " ,
" \\ bfrakw " : " 𝖜 " ,
" \\ bfrakx " : " 𝖝 " ,
" \\ bfraky " : " 𝖞 " ,
" \\ bfrakz " : " 𝖟 " ,
" \\ sansA " : " 𝖠 " ,
" \\ sansB " : " 𝖡 " ,
" \\ sansC " : " 𝖢 " ,
" \\ sansD " : " 𝖣 " ,
" \\ sansE " : " 𝖤 " ,
" \\ sansF " : " 𝖥 " ,
" \\ sansG " : " 𝖦 " ,
" \\ sansH " : " 𝖧 " ,
" \\ sansI " : " 𝖨 " ,
" \\ sansJ " : " 𝖩 " ,
" \\ sansK " : " 𝖪 " ,
" \\ sansL " : " 𝖫 " ,
" \\ sansM " : " 𝖬 " ,
" \\ sansN " : " 𝖭 " ,
" \\ sansO " : " 𝖮 " ,
" \\ sansP " : " 𝖯 " ,
" \\ sansQ " : " 𝖰 " ,
" \\ sansR " : " 𝖱 " ,
" \\ sansS " : " 𝖲 " ,
" \\ sansT " : " 𝖳 " ,
" \\ sansU " : " 𝖴 " ,
" \\ sansV " : " 𝖵 " ,
" \\ sansW " : " 𝖶 " ,
" \\ sansX " : " 𝖷 " ,
" \\ sansY " : " 𝖸 " ,
" \\ sansZ " : " 𝖹 " ,
" \\ sansa " : " 𝖺 " ,
" \\ sansb " : " 𝖻 " ,
" \\ sansc " : " 𝖼 " ,
" \\ sansd " : " 𝖽 " ,
" \\ sanse " : " 𝖾 " ,
" \\ sansf " : " 𝖿 " ,
" \\ sansg " : " 𝗀 " ,
" \\ sansh " : " 𝗁 " ,
" \\ sansi " : " 𝗂 " ,
" \\ sansj " : " 𝗃 " ,
" \\ sansk " : " 𝗄 " ,
" \\ sansl " : " 𝗅 " ,
" \\ sansm " : " 𝗆 " ,
" \\ sansn " : " 𝗇 " ,
" \\ sanso " : " 𝗈 " ,
" \\ sansp " : " 𝗉 " ,
" \\ sansq " : " 𝗊 " ,
" \\ sansr " : " 𝗋 " ,
" \\ sanss " : " 𝗌 " ,
" \\ sanst " : " 𝗍 " ,
" \\ sansu " : " 𝗎 " ,
" \\ sansv " : " 𝗏 " ,
" \\ sansw " : " 𝗐 " ,
" \\ sansx " : " 𝗑 " ,
" \\ sansy " : " 𝗒 " ,
" \\ sansz " : " 𝗓 " ,
" \\ bsansA " : " 𝗔 " ,
" \\ bsansB " : " 𝗕 " ,
" \\ bsansC " : " 𝗖 " ,
" \\ bsansD " : " 𝗗 " ,
" \\ bsansE " : " 𝗘 " ,
" \\ bsansF " : " 𝗙 " ,
" \\ bsansG " : " 𝗚 " ,
" \\ bsansH " : " 𝗛 " ,
" \\ bsansI " : " 𝗜 " ,
" \\ bsansJ " : " 𝗝 " ,
" \\ bsansK " : " 𝗞 " ,
" \\ bsansL " : " 𝗟 " ,
" \\ bsansM " : " 𝗠 " ,
" \\ bsansN " : " 𝗡 " ,
" \\ bsansO " : " 𝗢 " ,
" \\ bsansP " : " 𝗣 " ,
" \\ bsansQ " : " 𝗤 " ,
" \\ bsansR " : " 𝗥 " ,
" \\ bsansS " : " 𝗦 " ,
" \\ bsansT " : " 𝗧 " ,
" \\ bsansU " : " 𝗨 " ,
" \\ bsansV " : " 𝗩 " ,
" \\ bsansW " : " 𝗪 " ,
" \\ bsansX " : " 𝗫 " ,
" \\ bsansY " : " 𝗬 " ,
" \\ bsansZ " : " 𝗭 " ,
" \\ bsansa " : " 𝗮 " ,
" \\ bsansb " : " 𝗯 " ,
" \\ bsansc " : " 𝗰 " ,
" \\ bsansd " : " 𝗱 " ,
" \\ bsanse " : " 𝗲 " ,
" \\ bsansf " : " 𝗳 " ,
" \\ bsansg " : " 𝗴 " ,
" \\ bsansh " : " 𝗵 " ,
" \\ bsansi " : " 𝗶 " ,
" \\ bsansj " : " 𝗷 " ,
" \\ bsansk " : " 𝗸 " ,
" \\ bsansl " : " 𝗹 " ,
" \\ bsansm " : " 𝗺 " ,
" \\ bsansn " : " 𝗻 " ,
" \\ bsanso " : " 𝗼 " ,
" \\ bsansp " : " 𝗽 " ,
" \\ bsansq " : " 𝗾 " ,
" \\ bsansr " : " 𝗿 " ,
" \\ bsanss " : " 𝘀 " ,
" \\ bsanst " : " 𝘁 " ,
" \\ bsansu " : " 𝘂 " ,
" \\ bsansv " : " 𝘃 " ,
" \\ bsansw " : " 𝘄 " ,
" \\ bsansx " : " 𝘅 " ,
" \\ bsansy " : " 𝘆 " ,
" \\ bsansz " : " 𝘇 " ,
" \\ isansA " : " 𝘈 " ,
" \\ isansB " : " 𝘉 " ,
" \\ isansC " : " 𝘊 " ,
" \\ isansD " : " 𝘋 " ,
" \\ isansE " : " 𝘌 " ,
" \\ isansF " : " 𝘍 " ,
" \\ isansG " : " 𝘎 " ,
" \\ isansH " : " 𝘏 " ,
" \\ isansI " : " 𝘐 " ,
" \\ isansJ " : " 𝘑 " ,
" \\ isansK " : " 𝘒 " ,
" \\ isansL " : " 𝘓 " ,
" \\ isansM " : " 𝘔 " ,
" \\ isansN " : " 𝘕 " ,
" \\ isansO " : " 𝘖 " ,
" \\ isansP " : " 𝘗 " ,
" \\ isansQ " : " 𝘘 " ,
" \\ isansR " : " 𝘙 " ,
" \\ isansS " : " 𝘚 " ,
" \\ isansT " : " 𝘛 " ,
" \\ isansU " : " 𝘜 " ,
" \\ isansV " : " 𝘝 " ,
" \\ isansW " : " 𝘞 " ,
" \\ isansX " : " 𝘟 " ,
" \\ isansY " : " 𝘠 " ,
" \\ isansZ " : " 𝘡 " ,
" \\ isansa " : " 𝘢 " ,
" \\ isansb " : " 𝘣 " ,
" \\ isansc " : " 𝘤 " ,
" \\ isansd " : " 𝘥 " ,
" \\ isanse " : " 𝘦 " ,
" \\ isansf " : " 𝘧 " ,
" \\ isansg " : " 𝘨 " ,
" \\ isansh " : " 𝘩 " ,
" \\ isansi " : " 𝘪 " ,
" \\ isansj " : " 𝘫 " ,
" \\ isansk " : " 𝘬 " ,
" \\ isansl " : " 𝘭 " ,
" \\ isansm " : " 𝘮 " ,
" \\ isansn " : " 𝘯 " ,
" \\ isanso " : " 𝘰 " ,
" \\ isansp " : " 𝘱 " ,
" \\ isansq " : " 𝘲 " ,
" \\ isansr " : " 𝘳 " ,
" \\ isanss " : " 𝘴 " ,
" \\ isanst " : " 𝘵 " ,
" \\ isansu " : " 𝘶 " ,
" \\ isansv " : " 𝘷 " ,
" \\ isansw " : " 𝘸 " ,
" \\ isansx " : " 𝘹 " ,
" \\ isansy " : " 𝘺 " ,
" \\ isansz " : " 𝘻 " ,
" \\ bisansA " : " 𝘼 " ,
" \\ bisansB " : " 𝘽 " ,
" \\ bisansC " : " 𝘾 " ,
" \\ bisansD " : " 𝘿 " ,
" \\ bisansE " : " 𝙀 " ,
" \\ bisansF " : " 𝙁 " ,
" \\ bisansG " : " 𝙂 " ,
" \\ bisansH " : " 𝙃 " ,
" \\ bisansI " : " 𝙄 " ,
" \\ bisansJ " : " 𝙅 " ,
" \\ bisansK " : " 𝙆 " ,
" \\ bisansL " : " 𝙇 " ,
" \\ bisansM " : " 𝙈 " ,
" \\ bisansN " : " 𝙉 " ,
" \\ bisansO " : " 𝙊 " ,
" \\ bisansP " : " 𝙋 " ,
" \\ bisansQ " : " 𝙌 " ,
" \\ bisansR " : " 𝙍 " ,
" \\ bisansS " : " 𝙎 " ,
" \\ bisansT " : " 𝙏 " ,
" \\ bisansU " : " 𝙐 " ,
" \\ bisansV " : " 𝙑 " ,
" \\ bisansW " : " 𝙒 " ,
" \\ bisansX " : " 𝙓 " ,
" \\ bisansY " : " 𝙔 " ,
" \\ bisansZ " : " 𝙕 " ,
" \\ bisansa " : " 𝙖 " ,
" \\ bisansb " : " 𝙗 " ,
" \\ bisansc " : " 𝙘 " ,
" \\ bisansd " : " 𝙙 " ,
" \\ bisanse " : " 𝙚 " ,
" \\ bisansf " : " 𝙛 " ,
" \\ bisansg " : " 𝙜 " ,
" \\ bisansh " : " 𝙝 " ,
" \\ bisansi " : " 𝙞 " ,
" \\ bisansj " : " 𝙟 " ,
" \\ bisansk " : " 𝙠 " ,
" \\ bisansl " : " 𝙡 " ,
" \\ bisansm " : " 𝙢 " ,
" \\ bisansn " : " 𝙣 " ,
" \\ bisanso " : " 𝙤 " ,
" \\ bisansp " : " 𝙥 " ,
" \\ bisansq " : " 𝙦 " ,
" \\ bisansr " : " 𝙧 " ,
" \\ bisanss " : " 𝙨 " ,
" \\ bisanst " : " 𝙩 " ,
" \\ bisansu " : " 𝙪 " ,
" \\ bisansv " : " 𝙫 " ,
" \\ bisansw " : " 𝙬 " ,
" \\ bisansx " : " 𝙭 " ,
" \\ bisansy " : " 𝙮 " ,
" \\ bisansz " : " 𝙯 " ,
" \\ ttA " : " 𝙰 " ,
" \\ ttB " : " 𝙱 " ,
" \\ ttC " : " 𝙲 " ,
" \\ ttD " : " 𝙳 " ,
" \\ ttE " : " 𝙴 " ,
" \\ ttF " : " 𝙵 " ,
" \\ ttG " : " 𝙶 " ,
" \\ ttH " : " 𝙷 " ,
" \\ ttI " : " 𝙸 " ,
" \\ ttJ " : " 𝙹 " ,
" \\ ttK " : " 𝙺 " ,
" \\ ttL " : " 𝙻 " ,
" \\ ttM " : " 𝙼 " ,
" \\ ttN " : " 𝙽 " ,
" \\ ttO " : " 𝙾 " ,
" \\ ttP " : " 𝙿 " ,
" \\ ttQ " : " 𝚀 " ,
" \\ ttR " : " 𝚁 " ,
" \\ ttS " : " 𝚂 " ,
" \\ ttT " : " 𝚃 " ,
" \\ ttU " : " 𝚄 " ,
" \\ ttV " : " 𝚅 " ,
" \\ ttW " : " 𝚆 " ,
" \\ ttX " : " 𝚇 " ,
" \\ ttY " : " 𝚈 " ,
" \\ ttZ " : " 𝚉 " ,
" \\ tta " : " 𝚊 " ,
" \\ ttb " : " 𝚋 " ,
" \\ ttc " : " 𝚌 " ,
" \\ ttd " : " 𝚍 " ,
" \\ tte " : " 𝚎 " ,
" \\ ttf " : " 𝚏 " ,
" \\ ttg " : " 𝚐 " ,
" \\ tth " : " 𝚑 " ,
" \\ tti " : " 𝚒 " ,
" \\ ttj " : " 𝚓 " ,
" \\ ttk " : " 𝚔 " ,
" \\ ttl " : " 𝚕 " ,
" \\ ttm " : " 𝚖 " ,
" \\ ttn " : " 𝚗 " ,
" \\ tto " : " 𝚘 " ,
" \\ ttp " : " 𝚙 " ,
" \\ ttq " : " 𝚚 " ,
" \\ ttr " : " 𝚛 " ,
" \\ tts " : " 𝚜 " ,
" \\ ttt " : " 𝚝 " ,
" \\ ttu " : " 𝚞 " ,
" \\ ttv " : " 𝚟 " ,
" \\ ttw " : " 𝚠 " ,
" \\ ttx " : " 𝚡 " ,
" \\ tty " : " 𝚢 " ,
" \\ ttz " : " 𝚣 " ,
" \\ bfAlpha " : " 𝚨 " ,
" \\ bfBeta " : " 𝚩 " ,
" \\ bfGamma " : " 𝚪 " ,
" \\ bfDelta " : " 𝚫 " ,
" \\ bfEpsilon " : " 𝚬 " ,
" \\ bfZeta " : " 𝚭 " ,
" \\ bfEta " : " 𝚮 " ,
" \\ bfTheta " : " 𝚯 " ,
" \\ bfIota " : " 𝚰 " ,
" \\ bfKappa " : " 𝚱 " ,
" \\ bfLambda " : " 𝚲 " ,
" \\ bfMu " : " 𝚳 " ,
" \\ bfNu " : " 𝚴 " ,
" \\ bfXi " : " 𝚵 " ,
" \\ bfOmicron " : " 𝚶 " ,
" \\ bfPi " : " 𝚷 " ,
" \\ bfRho " : " 𝚸 " ,
" \\ bfvarTheta " : " 𝚹 " ,
" \\ bfSigma " : " 𝚺 " ,
" \\ bfTau " : " 𝚻 " ,
" \\ bfUpsilon " : " 𝚼 " ,
" \\ bfPhi " : " 𝚽 " ,
" \\ bfChi " : " 𝚾 " ,
" \\ bfPsi " : " 𝚿 " ,
" \\ bfOmega " : " 𝛀 " ,
" \\ bfalpha " : " 𝛂 " ,
" \\ bfbeta " : " 𝛃 " ,
" \\ bfgamma " : " 𝛄 " ,
" \\ bfdelta " : " 𝛅 " ,
" \\ bfepsilon " : " 𝛆 " ,
" \\ bfzeta " : " 𝛇 " ,
" \\ bfeta " : " 𝛈 " ,
" \\ bftheta " : " 𝛉 " ,
" \\ bfiota " : " 𝛊 " ,
" \\ bfkappa " : " 𝛋 " ,
" \\ bflambda " : " 𝛌 " ,
" \\ bfmu " : " 𝛍 " ,
" \\ bfnu " : " 𝛎 " ,
" \\ bfxi " : " 𝛏 " ,
" \\ bfomicron " : " 𝛐 " ,
" \\ bfpi " : " 𝛑 " ,
" \\ bfrho " : " 𝛒 " ,
" \\ bfvarsigma " : " 𝛓 " ,
" \\ bfsigma " : " 𝛔 " ,
" \\ bftau " : " 𝛕 " ,
" \\ bfupsilon " : " 𝛖 " ,
" \\ bfvarphi " : " 𝛗 " ,
" \\ bfchi " : " 𝛘 " ,
" \\ bfpsi " : " 𝛙 " ,
" \\ bfomega " : " 𝛚 " ,
" \\ bfvarepsilon " : " 𝛜 " ,
" \\ bfvartheta " : " 𝛝 " ,
" \\ bfvarkappa " : " 𝛞 " ,
" \\ bfphi " : " 𝛟 " ,
" \\ bfvarrho " : " 𝛠 " ,
" \\ bfvarpi " : " 𝛡 " ,
" \\ itAlpha " : " 𝛢 " ,
" \\ itBeta " : " 𝛣 " ,
" \\ itGamma " : " 𝛤 " ,
" \\ itDelta " : " 𝛥 " ,
" \\ itEpsilon " : " 𝛦 " ,
" \\ itZeta " : " 𝛧 " ,
" \\ itEta " : " 𝛨 " ,
" \\ itTheta " : " 𝛩 " ,
" \\ itIota " : " 𝛪 " ,
" \\ itKappa " : " 𝛫 " ,
" \\ itLambda " : " 𝛬 " ,
" \\ itMu " : " 𝛭 " ,
" \\ itNu " : " 𝛮 " ,
" \\ itXi " : " 𝛯 " ,
" \\ itOmicron " : " 𝛰 " ,
" \\ itPi " : " 𝛱 " ,
" \\ itRho " : " 𝛲 " ,
" \\ itvarTheta " : " 𝛳 " ,
" \\ itSigma " : " 𝛴 " ,
" \\ itTau " : " 𝛵 " ,
" \\ itUpsilon " : " 𝛶 " ,
" \\ itPhi " : " 𝛷 " ,
" \\ itChi " : " 𝛸 " ,
" \\ itPsi " : " 𝛹 " ,
" \\ itOmega " : " 𝛺 " ,
" \\ italpha " : " 𝛼 " ,
" \\ itbeta " : " 𝛽 " ,
" \\ itgamma " : " 𝛾 " ,
" \\ itdelta " : " 𝛿 " ,
" \\ itepsilon " : " 𝜀 " ,
" \\ itzeta " : " 𝜁 " ,
" \\ iteta " : " 𝜂 " ,
" \\ ittheta " : " 𝜃 " ,
" \\ itiota " : " 𝜄 " ,
" \\ itkappa " : " 𝜅 " ,
" \\ itlambda " : " 𝜆 " ,
" \\ itmu " : " 𝜇 " ,
" \\ itnu " : " 𝜈 " ,
" \\ itxi " : " 𝜉 " ,
" \\ itomicron " : " 𝜊 " ,
" \\ itpi " : " 𝜋 " ,
" \\ itrho " : " 𝜌 " ,
" \\ itvarsigma " : " 𝜍 " ,
" \\ itsigma " : " 𝜎 " ,
" \\ ittau " : " 𝜏 " ,
" \\ itupsilon " : " 𝜐 " ,
" \\ itphi " : " 𝜑 " ,
" \\ itchi " : " 𝜒 " ,
" \\ itpsi " : " 𝜓 " ,
" \\ itomega " : " 𝜔 " ,
" \\ itvarepsilon " : " 𝜖 " ,
" \\ itvartheta " : " 𝜗 " ,
" \\ itvarkappa " : " 𝜘 " ,
" \\ itvarphi " : " 𝜙 " ,
" \\ itvarrho " : " 𝜚 " ,
" \\ itvarpi " : " 𝜛 " ,
" \\ biAlpha " : " 𝜜 " ,
" \\ biBeta " : " 𝜝 " ,
" \\ biGamma " : " 𝜞 " ,
" \\ biDelta " : " 𝜟 " ,
" \\ biEpsilon " : " 𝜠 " ,
" \\ biZeta " : " 𝜡 " ,
" \\ biEta " : " 𝜢 " ,
" \\ biTheta " : " 𝜣 " ,
" \\ biIota " : " 𝜤 " ,
" \\ biKappa " : " 𝜥 " ,
" \\ biLambda " : " 𝜦 " ,
" \\ biMu " : " 𝜧 " ,
" \\ biNu " : " 𝜨 " ,
" \\ biXi " : " 𝜩 " ,
" \\ biOmicron " : " 𝜪 " ,
" \\ biPi " : " 𝜫 " ,
" \\ biRho " : " 𝜬 " ,
" \\ bivarTheta " : " 𝜭 " ,
" \\ biSigma " : " 𝜮 " ,
" \\ biTau " : " 𝜯 " ,
" \\ biUpsilon " : " 𝜰 " ,
" \\ biPhi " : " 𝜱 " ,
" \\ biChi " : " 𝜲 " ,
" \\ biPsi " : " 𝜳 " ,
" \\ biOmega " : " 𝜴 " ,
" \\ bialpha " : " 𝜶 " ,
" \\ bibeta " : " 𝜷 " ,
" \\ bigamma " : " 𝜸 " ,
" \\ bidelta " : " 𝜹 " ,
" \\ biepsilon " : " 𝜺 " ,
" \\ bizeta " : " 𝜻 " ,
" \\ bieta " : " 𝜼 " ,
" \\ bitheta " : " 𝜽 " ,
" \\ biiota " : " 𝜾 " ,
" \\ bikappa " : " 𝜿 " ,
" \\ bilambda " : " 𝝀 " ,
" \\ bimu " : " 𝝁 " ,
" \\ binu " : " 𝝂 " ,
" \\ bixi " : " 𝝃 " ,
" \\ biomicron " : " 𝝄 " ,
" \\ bipi " : " 𝝅 " ,
" \\ birho " : " 𝝆 " ,
" \\ bivarsigma " : " 𝝇 " ,
" \\ bisigma " : " 𝝈 " ,
" \\ bitau " : " 𝝉 " ,
" \\ biupsilon " : " 𝝊 " ,
" \\ biphi " : " 𝝋 " ,
" \\ bichi " : " 𝝌 " ,
" \\ bipsi " : " 𝝍 " ,
" \\ biomega " : " 𝝎 " ,
" \\ bivarepsilon " : " 𝝐 " ,
" \\ bivartheta " : " 𝝑 " ,
" \\ bivarkappa " : " 𝝒 " ,
" \\ bivarphi " : " 𝝓 " ,
" \\ bivarrho " : " 𝝔 " ,
" \\ bivarpi " : " 𝝕 " ,
" \\ bsansAlpha " : " 𝝖 " ,
" \\ bsansBeta " : " 𝝗 " ,
" \\ bsansGamma " : " 𝝘 " ,
" \\ bsansDelta " : " 𝝙 " ,
" \\ bsansEpsilon " : " 𝝚 " ,
" \\ bsansZeta " : " 𝝛 " ,
" \\ bsansEta " : " 𝝜 " ,
" \\ bsansTheta " : " 𝝝 " ,
" \\ bsansIota " : " 𝝞 " ,
" \\ bsansKappa " : " 𝝟 " ,
" \\ bsansLambda " : " 𝝠 " ,
" \\ bsansMu " : " 𝝡 " ,
" \\ bsansNu " : " 𝝢 " ,
" \\ bsansXi " : " 𝝣 " ,
" \\ bsansOmicron " : " 𝝤 " ,
" \\ bsansPi " : " 𝝥 " ,
" \\ bsansRho " : " 𝝦 " ,
" \\ bsansvarTheta " : " 𝝧 " ,
" \\ bsansSigma " : " 𝝨 " ,
" \\ bsansTau " : " 𝝩 " ,
" \\ bsansUpsilon " : " 𝝪 " ,
" \\ bsansPhi " : " 𝝫 " ,
" \\ bsansChi " : " 𝝬 " ,
" \\ bsansPsi " : " 𝝭 " ,
" \\ bsansOmega " : " 𝝮 " ,
" \\ bsansalpha " : " 𝝰 " ,
" \\ bsansbeta " : " 𝝱 " ,
" \\ bsansgamma " : " 𝝲 " ,
" \\ bsansdelta " : " 𝝳 " ,
" \\ bsansepsilon " : " 𝝴 " ,
" \\ bsanszeta " : " 𝝵 " ,
" \\ bsanseta " : " 𝝶 " ,
" \\ bsanstheta " : " 𝝷 " ,
" \\ bsansiota " : " 𝝸 " ,
" \\ bsanskappa " : " 𝝹 " ,
" \\ bsanslambda " : " 𝝺 " ,
" \\ bsansmu " : " 𝝻 " ,
" \\ bsansnu " : " 𝝼 " ,
" \\ bsansxi " : " 𝝽 " ,
" \\ bsansomicron " : " 𝝾 " ,
" \\ bsanspi " : " 𝝿 " ,
" \\ bsansrho " : " 𝞀 " ,
" \\ bsansvarsigma " : " 𝞁 " ,
" \\ bsanssigma " : " 𝞂 " ,
" \\ bsanstau " : " 𝞃 " ,
" \\ bsansupsilon " : " 𝞄 " ,
" \\ bsansphi " : " 𝞅 " ,
" \\ bsanschi " : " 𝞆 " ,
" \\ bsanspsi " : " 𝞇 " ,
" \\ bsansomega " : " 𝞈 " ,
" \\ bsansvarepsilon " : " 𝞊 " ,
" \\ bsansvartheta " : " 𝞋 " ,
" \\ bsansvarkappa " : " 𝞌 " ,
" \\ bsansvarphi " : " 𝞍 " ,
" \\ bsansvarrho " : " 𝞎 " ,
" \\ bsansvarpi " : " 𝞏 " ,
" \\ bisansAlpha " : " 𝞐 " ,
" \\ bisansBeta " : " 𝞑 " ,
" \\ bisansGamma " : " 𝞒 " ,
" \\ bisansDelta " : " 𝞓 " ,
" \\ bisansEpsilon " : " 𝞔 " ,
" \\ bisansZeta " : " 𝞕 " ,
" \\ bisansEta " : " 𝞖 " ,
" \\ bisansTheta " : " 𝞗 " ,
" \\ bisansIota " : " 𝞘 " ,
" \\ bisansKappa " : " 𝞙 " ,
" \\ bisansLambda " : " 𝞚 " ,
" \\ bisansMu " : " 𝞛 " ,
" \\ bisansNu " : " 𝞜 " ,
" \\ bisansXi " : " 𝞝 " ,
" \\ bisansOmicron " : " 𝞞 " ,
" \\ bisansPi " : " 𝞟 " ,
" \\ bisansRho " : " 𝞠 " ,
" \\ bisansvarTheta " : " 𝞡 " ,
" \\ bisansSigma " : " 𝞢 " ,
" \\ bisansTau " : " 𝞣 " ,
" \\ bisansUpsilon " : " 𝞤 " ,
" \\ bisansPhi " : " 𝞥 " ,
" \\ bisansChi " : " 𝞦 " ,
" \\ bisansPsi " : " 𝞧 " ,
" \\ bisansOmega " : " 𝞨 " ,
" \\ bisansalpha " : " 𝞪 " ,
" \\ bisansbeta " : " 𝞫 " ,
" \\ bisansgamma " : " 𝞬 " ,
" \\ bisansdelta " : " 𝞭 " ,
" \\ bisansepsilon " : " 𝞮 " ,
" \\ bisanszeta " : " 𝞯 " ,
" \\ bisanseta " : " 𝞰 " ,
" \\ bisanstheta " : " 𝞱 " ,
" \\ bisansiota " : " 𝞲 " ,
" \\ bisanskappa " : " 𝞳 " ,
" \\ bisanslambda " : " 𝞴 " ,
" \\ bisansmu " : " 𝞵 " ,
" \\ bisansnu " : " 𝞶 " ,
" \\ bisansxi " : " 𝞷 " ,
" \\ bisansomicron " : " 𝞸 " ,
" \\ bisanspi " : " 𝞹 " ,
" \\ bisansrho " : " 𝞺 " ,
" \\ bisansvarsigma " : " 𝞻 " ,
" \\ bisanssigma " : " 𝞼 " ,
" \\ bisanstau " : " 𝞽 " ,
" \\ bisansupsilon " : " 𝞾 " ,
" \\ bisansphi " : " 𝞿 " ,
" \\ bisanschi " : " 𝟀 " ,
" \\ bisanspsi " : " 𝟁 " ,
" \\ bisansomega " : " 𝟂 " ,
" \\ bisansvarepsilon " : " 𝟄 " ,
" \\ bisansvartheta " : " 𝟅 " ,
" \\ bisansvarkappa " : " 𝟆 " ,
" \\ bisansvarphi " : " 𝟇 " ,
" \\ bisansvarrho " : " 𝟈 " ,
" \\ bisansvarpi " : " 𝟉 " ,
" \\ bfzero " : " 𝟎 " ,
" \\ bfone " : " 𝟏 " ,
" \\ bftwo " : " 𝟐 " ,
" \\ bfthree " : " 𝟑 " ,
" \\ bffour " : " 𝟒 " ,
" \\ bffive " : " 𝟓 " ,
" \\ bfsix " : " 𝟔 " ,
" \\ bfseven " : " 𝟕 " ,
" \\ bfeight " : " 𝟖 " ,
" \\ bfnine " : " 𝟗 " ,
" \\ bbzero " : " 𝟘 " ,
" \\ bbone " : " 𝟙 " ,
" \\ bbtwo " : " 𝟚 " ,
" \\ bbthree " : " 𝟛 " ,
" \\ bbfour " : " 𝟜 " ,
" \\ bbfive " : " 𝟝 " ,
" \\ bbsix " : " 𝟞 " ,
" \\ bbseven " : " 𝟟 " ,
" \\ bbeight " : " 𝟠 " ,
" \\ bbnine " : " 𝟡 " ,
" \\ sanszero " : " 𝟢 " ,
" \\ sansone " : " 𝟣 " ,
" \\ sanstwo " : " 𝟤 " ,
" \\ sansthree " : " 𝟥 " ,
" \\ sansfour " : " 𝟦 " ,
" \\ sansfive " : " 𝟧 " ,
" \\ sanssix " : " 𝟨 " ,
" \\ sansseven " : " 𝟩 " ,
" \\ sanseight " : " 𝟪 " ,
" \\ sansnine " : " 𝟫 " ,
" \\ bsanszero " : " 𝟬 " ,
" \\ bsansone " : " 𝟭 " ,
" \\ bsanstwo " : " 𝟮 " ,
" \\ bsansthree " : " 𝟯 " ,
" \\ bsansfour " : " 𝟰 " ,
" \\ bsansfive " : " 𝟱 " ,
" \\ bsanssix " : " 𝟲 " ,
" \\ bsansseven " : " 𝟳 " ,
" \\ bsanseight " : " 𝟴 " ,
" \\ bsansnine " : " 𝟵 " ,
" \\ ttzero " : " 𝟶 " ,
" \\ ttone " : " 𝟷 " ,
" \\ tttwo " : " 𝟸 " ,
" \\ ttthree " : " 𝟹 " ,
" \\ ttfour " : " 𝟺 " ,
" \\ ttfive " : " 𝟻 " ,
" \\ ttsix " : " 𝟼 " ,
" \\ ttseven " : " 𝟽 " ,
" \\ tteight " : " 𝟾 " ,
" \\ ttnine " : " 𝟿 " ,
" \\ underbar " : " ̲ " ,
" \\ underleftrightarrow " : " ͍ " ,
}
reverse_latex_symbol = { v : k for k , v in latex_symbols . items ( ) }