V!\c@sWi dd6dd6dd6dd6dd 6d d 6d d 6dd6dd6dd6dd6dd6dd6dd6dd6dd6d d!6d"d#6d$d%6d&d'6d(d)6d*d+6d,d-6d.d/6d0d16d2d36d4d56d6d76d8d96d:d;6d<d=6d>d?6d@dA6dBdC6dDdE6dFdG6dHdI6dJdK6dLdM6dNdO6dPdQ6dRdS6dTdU6dVdW6dXdY6dZd[6d\d]6d^d_6d`da6dbdc6ddde6dfdg6dhdi6djdk6dldm6dndo6dpdq6drds6dtdu6dvdw6dxdy6dzd{6d|d}6d~d6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd 6d d 6d d 6dd6dd6dd6dd6dd6dd6dd6dd6dd6d d!6d"d#6d$d%6d&d'6d(d)6d*d+6d,d-6d.d/6d0d16d2d36d4d56d6d76d8d96d:d;6d<d=6d>d?6d@dA6dBdC6dDdE6dFdG6dHdI6dJdK6dLdM6dNdO6dPdQ6dRdS6dTdU6dVdW6dXdY6dZd[6d\d]6d^d_6d`da6dbdc6ddde6dfdg6dhdi6djdk6dldm6dndo6dpdq6drds6dtdu6dvdw6dxdy6dzd{6d|d}6d~d6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd 6d d 6d d 6dd6dd6dd6dd6dd6dd6dd6dd6dd6d d!6d"d#6d$d%6d&d'6d(d)6d*d+6d,d-6d.d/6d0d16d2d36d4d56d6d76d8d96d:d;6d<d=6d>d?6d@dA6dBdC6dDdE6dFdG6dHdI6dJdK6dLdM6dNdO6dPdQ6dRdS6dTdU6dVdW6dXdY6dZd[6d\d]6d^d_6d`da6dbdc6ddde6dfdg6dhdi6djdk6dldm6dndo6dpdq6drds6dtdu6dvdw6dxdy6dzd{6d|d}6d~d6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd 6d d 6d d 6dd6dd6dd6dd6dd6dd6dd6dd6dd6d d!6d"d#6d$d%6d&d'6d(d)6d*d+6d,d-6d.d/6d0d16d2d36d4d56d6d76d8d96d:d;6d<d=6d>d?6d@dA6dBdC6dDdE6dFdG6dHdI6dJdK6dLdM6dNdO6dPdQ6dRdS6dTdU6dVdW6dXdY6dZd[6d\d]6d^d_6d`da6dbdc6ddde6dfdg6dhdi6djdk6dldm6dndo6dpdq6drds6dtdu6dvdw6dxdy6dzd{6d|d}6d~d6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd 6d d 6d d 6dd6dd6dd6dd6dd6dd6dd6dd6dd6d d!6d"d#6d$d%6d&d'6d(d)6d*d+6d,d-6d.d/6d0d16d2d36d4d56d6d76d8d96d:d;6d<d=6d>d?6d@dA6dBdC6dDdE6dFdG6dHdI6dJdK6dLdM6dNdO6dPdQ6dRdS6dTdU6dVdW6dXdY6dZd[6d\d]6d^d_6d`da6dbdc6ddde6dfdg6dhdi6djdk6dldm6dndo6dpdq6drds6dtdu6dvdw6dxdy6dzd{6d|d}6d~d6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd 6d d 6d d 6dd6dd6dd6dd6dd6dd6dd6dd6dd6d d!6d"d#6d$d%6d&d'6d(d)6d*d+6d,d-6d.d/6d0d16d2d36d4d56d6d76d8d96d:d;6d<d=6d>d?6d@dA6dBdC6dDdE6dFdG6dHdI6dJdK6dLdM6dNdO6dPdQ6dRdS6dTdU6dVdW6dXdY6dZd[6d\d]6d^d_6d`da6dbdc6ddde6dfdg6dhdi6djdk6ddl6ddm6dndo6dpdq6drds6dtdu6dvdw6dxdy6dzd{6d|d}6d~d6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6d,d6d.d6d0d6d2d6d4d6d6d6d8d6d:d6d<d6d>d6d@d6dBd6dDd6dFd6dHd6dJd6dLd6dNd6dPd6dRd6dTd6dVd6dXd6dZd6d*d6dd6d\d6dd6d^d6dd6d`d6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6dd6ZdS(u~iu\pounds iu\yen iu\neg iu \circledR iu\pm iu\times iu\eth iu\div iu\imath i1u\jmath i7u\Gamma iu\Delta iu\Theta iu\Lambda iu\Xi iu\Pi iu\Sigma iu \Upsilon iu\Phi iu\Psi iu\Omega iu\alpha iu\beta iu\gamma iu\delta iu \varepsilon iu\zeta iu\eta iu\theta iu\iota iu\kappa iu\lambda iu\mu iu\nu iu\xi iu\pi iu\rho iu \varsigma iu\sigma iu\tau iu \upsilon iu\varphi iu\chi iu\psi iu\omega iu \vartheta iu\phi iu\varpi iu \digamma iu \backepsilon iu\quad i u\| i u\dagger i u \ddagger i! u\ldots i& u\prime i2 u \backprime i5 u\: i_ u \mathbb{C}i!u \mathcal{H}i !u \mathfrak{H}i !u \mathbb{H}i !u\hslash i!u \mathcal{I}i!u\Im i!u \mathcal{L}i!u\ell i!u \mathbb{N}i!u\wp i!u \mathbb{P}i!u \mathbb{Q}i!u \mathcal{R}i!u\Re i!u \mathbb{R}i!u \mathbb{Z}i$!u\mho i'!u \mathfrak{Z}i(!u \mathcal{B}i,!u \mathfrak{C}i-!u \mathcal{E}i0!u \mathcal{F}i1!u\Finv i2!u \mathcal{M}i3!u\aleph i5!u\beth i6!u\gimel i7!u\daleth i8!u \leftarrow i!u \uparrow i!u \rightarrow i!u \downarrow i!u\leftrightarrow i!u \updownarrow i!u \nwarrow i!u \nearrow i!u \searrow i!u \swarrow i!u \nleftarrow i!u \nrightarrow i!u\twoheadleftarrow i!u\twoheadrightarrow i!u\leftarrowtail i!u\rightarrowtail i!u\mapsto i!u\hookleftarrow i!u\hookrightarrow i!u\looparrowleft i!u\looparrowright i!u\leftrightsquigarrow i!u\nleftrightarrow i!u\Lsh i!u\Rsh i!u\curvearrowleft i!u\curvearrowright i!u\circlearrowleft i!u\circlearrowright i!u\leftharpoonup i!u\leftharpoondown i!u\upharpoonright i!u\upharpoonleft i!u\rightharpoonup i!u\rightharpoondown i!u\downharpoonright i!u\downharpoonleft i!u\rightleftarrows i!u\leftrightarrows i!u\leftleftarrows i!u \upuparrows i!u\rightrightarrows i!u\downdownarrows i!u\leftrightharpoons i!u\rightleftharpoons i!u \nLeftarrow i!u\nLeftrightarrow i!u \nRightarrow i!u \Leftarrow i!u \Uparrow i!u \Rightarrow i!u \Downarrow i!u\Leftrightarrow i!u \Updownarrow i!u \Lleftarrow i!u \Rrightarrow i!u\rightsquigarrow i!u\dashleftarrow i!u\dashrightarrow i!u\forall i"u \complement i"u \partial i"u\exists i"u \nexists i"u \varnothing i"u\nabla i"u\in i"u\notin i "u\ni i "u\prod i"u\coprod i"u\sum i"u-i"u\mp i"u \dotplus i"u\slash i"u\smallsetminus i"u\ast i"u\circ i"u\bullet i"u\sqrt i"u \sqrt[3] i"u \sqrt[4] i"u\propto i"u\infty i"u\angle i "u\measuredangle i!"u\sphericalangle i""u\mid i#"u\nmid i$"u \parallel i%"u \nparallel i&"u\wedge i'"u\vee i("u\cap i)"u\cup i*"u\int i+"u\iint i,"u\iiint i-"u\oint i."u \therefore i4"u \because i5"u:i6"u\sim i<"u \backsim i="u\wr i@"u\nsim iA"u\eqsim iB"u\simeq iC"u\cong iE"u\ncong iG"u\approx iH"u \approxeq iJ"u\asymp iM"u\Bumpeq iN"u\bumpeq iO"u\doteq iP"u\Doteq iQ"u\fallingdotseq iR"u\risingdotseq iS"u\eqcirc iV"u\circeq iW"u \triangleq i\"u\neq i`"u\equiv ia"u\leq id"u\geq ie"u\leqq if"u\geqq ig"u\lneqq ih"u\gneqq ii"u\ll ij"u\gg ik"u \between il"u\nless in"u\ngtr io"u\nleq ip"u\ngeq iq"u \lesssim ir"u\gtrsim is"u \lessgtr iv"u \gtrless iw"u\prec iz"u\succ i{"u \preccurlyeq i|"u \succcurlyeq i}"u \precsim i~"u \succsim i"u\nprec i"u\nsucc i"u\subset i"u\supset i"u \subseteq i"u \supseteq i"u \nsubseteq i"u \nsupseteq i"u \subsetneq i"u \supsetneq i"u\uplus i"u \sqsubset i"u \sqsupset i"u \sqsubseteq i"u \sqsupseteq i"u\sqcap i"u\sqcup i"u\oplus i"u\ominus i"u\otimes i"u\oslash i"u\odot i"u \circledcirc i"u \circledast i"u \circleddash i"u \boxplus i"u \boxminus i"u \boxtimes i"u\boxdot i"u\vdash i"u\dashv i"u\top i"u\bot i"u\models i"u\vDash i"u\Vdash i"u\Vvdash i"u\nvdash i"u\nvDash i"u\nVdash i"u\nVDash i"u\vartriangleleft i"u\vartriangleright i"u\trianglelefteq i"u\trianglerighteq i"u \multimap i"u \intercal i"u\veebar i"u \barwedge i"u \bigwedge i"u\bigvee i"u\bigcap i"u\bigcup i"u \diamond i"u\cdot i"u\star i"u\divideontimes i"u\bowtie i"u\ltimes i"u\rtimes i"u\leftthreetimes i"u\rightthreetimes i"u \backsimeq i"u \curlyvee i"u \curlywedge i"u\Subset i"u\Supset i"u\Cap i"u\Cup i"u \pitchfork i"u \lessdot i"u\gtrdot i"u\lll i"u\ggg i"u \lesseqgtr i"u \gtreqless i"u \curlyeqprec i"u \curlyeqsucc i"u \npreceq i"u \nsucceq i"u\lnsim i"u\gnsim i"u \precnsim i"u \succnsim i"u\ntriangleleft i"u\ntriangleright i"u\ntrianglelefteq i"u\ntrianglerighteq i"u\vdots i"u\cdots i"u\ddots i"u\lceil i#u\rceil i #u\lfloor i #u\rfloor i #u \ulcorner i#u \urcorner i#u \llcorner i#u \lrcorner i#u\frown i"#u\smile i##u \overbrace i#u \underbrace i#u\bigtriangleup i%u\rhd i%u\bigtriangledown i%u\lhd i%u \Diamond i%u \lozenge i%u\square i%u \blacksquare i%u \bigstar i&u \spadesuit i`&u \heartsuit ia&u \diamondsuit ib&u \clubsuit ic&u\flat im&u \natural in&u\sharp io&u \checkmark i'u \maltese i 'u\perp i'u\langle i'u\rangle i'u\lgroup i'u\rgroup i'u\longleftarrow i'u\longrightarrow i'u\longleftrightarrow i'u\Longleftarrow i'u\Longrightarrow i'u\Longleftrightarrow i'u \longmapsto i'u\blacklozenge i)u \setminus i)u \bigodot i*u \bigoplus i*u \bigotimes i*u \biguplus i*u \bigsqcup i*u\iiiint i *u\Join i*u\amalg i?*u\doublebarwedge i^*u \leqslant i}*u \geqslant i~*u \lessapprox i*u \gtrapprox i*u\lneq i*u\gneq i*u \lnapprox i*u \gnapprox i*u \lesseqqgtr i*u \gtreqqless i*u \eqslantless i*u \eqslantgtr i*u\preceq i*u\succeq i*u \precapprox i*u \succapprox i*u \precnapprox i*u \succnapprox i*u \subseteqq i*u \supseteqq i*u \subsetneqq i*u \supsetneqq i*u \mathbf{A}iu \mathbf{B}iu \mathbf{C}iu \mathbf{D}iu \mathbf{E}iu \mathbf{F}iu \mathbf{G}iu \mathbf{H}iu \mathbf{I}iu \mathbf{J}i u \mathbf{K}i u \mathbf{L}i u \mathbf{M}i u \mathbf{N}i u \mathbf{O}iu \mathbf{P}iu \mathbf{Q}iu \mathbf{R}iu \mathbf{S}iu \mathbf{T}iu \mathbf{U}iu \mathbf{V}iu \mathbf{W}iu \mathbf{X}iu \mathbf{Y}iu \mathbf{Z}iu \mathbf{a}iu \mathbf{b}iu \mathbf{c}iu \mathbf{d}iu \mathbf{e}iu \mathbf{f}iu \mathbf{g}i u \mathbf{h}i!u \mathbf{i}i"u \mathbf{j}i#u \mathbf{k}i$u \mathbf{l}i%u \mathbf{m}i&u \mathbf{n}i'u \mathbf{o}i(u \mathbf{p}i)u \mathbf{q}i*u \mathbf{r}i+u \mathbf{s}i,u \mathbf{t}i-u \mathbf{u}i.u \mathbf{v}i/u \mathbf{w}i0u \mathbf{x}i1u \mathbf{y}i2u \mathbf{z}i3uAi4uBi5uCi6uDi7uEi8uFi9uGi:uHi;uIi<uJi=uKi>uLi?uMi@uNiAuOiBuPiCuQiDuRiEuSiFuTiGuUiHuViIuWiJuXiKuYiLuZiMuaiNubiOuciPudiQueiRufiSugiTuiiVujiWukiXuliYumiZuni[uoi\upi]uqi^uri_usi`utiauuibuvicuwiduxieuyifuzigu \mathcal{A}iu \mathcal{C}iu \mathcal{D}iu \mathcal{G}iu \mathcal{J}iu \mathcal{K}iu \mathcal{N}iu \mathcal{O}iu \mathcal{P}iu \mathcal{Q}iu \mathcal{S}iu \mathcal{T}iu \mathcal{U}iu \mathcal{V}iu \mathcal{W}iu \mathcal{X}iu \mathcal{Y}iu \mathcal{Z}iu \mathfrak{A}iu \mathfrak{B}iu \mathfrak{D}iu \mathfrak{E}iu \mathfrak{F}i u \mathfrak{G}i u \mathfrak{J}i u \mathfrak{K}iu \mathfrak{L}iu \mathfrak{M}iu \mathfrak{N}iu \mathfrak{O}iu \mathfrak{P}iu \mathfrak{Q}iu \mathfrak{S}iu \mathfrak{T}iu \mathfrak{U}iu \mathfrak{V}iu \mathfrak{W}iu \mathfrak{X}iu \mathfrak{Y}iu \mathfrak{a}iu \mathfrak{b}iu \mathfrak{c}i u \mathfrak{d}i!u \mathfrak{e}i"u \mathfrak{f}i#u \mathfrak{g}i$u \mathfrak{h}i%u \mathfrak{i}i&u \mathfrak{j}i'u \mathfrak{k}i(u \mathfrak{l}i)u \mathfrak{m}i*u \mathfrak{n}i+u \mathfrak{o}i,u \mathfrak{p}i-u \mathfrak{q}i.u \mathfrak{r}i/u \mathfrak{s}i0u \mathfrak{t}i1u \mathfrak{u}i2u \mathfrak{v}i3u \mathfrak{w}i4u \mathfrak{x}i5u \mathfrak{y}i6u \mathfrak{z}i7u \mathbb{A}i8u \mathbb{B}i9u \mathbb{D}i;u \mathbb{E}i<u \mathbb{F}i=u \mathbb{G}i>u \mathbb{I}i@u \mathbb{J}iAu \mathbb{K}iBu \mathbb{L}iCu \mathbb{M}iDu \mathbb{O}iFu \mathbb{S}iJu \mathbb{T}iKu \mathbb{U}iLu \mathbb{V}iMu \mathbb{W}iNu \mathbb{X}iOu \mathbb{Y}iPu\Bbbk i\u \mathsf{A}iu \mathsf{B}iu \mathsf{C}iu \mathsf{D}iu \mathsf{E}iu \mathsf{F}iu \mathsf{G}iu \mathsf{H}iu \mathsf{I}iu \mathsf{J}iu \mathsf{K}iu \mathsf{L}iu \mathsf{M}iu \mathsf{N}iu \mathsf{O}iu \mathsf{P}iu \mathsf{Q}iu \mathsf{R}iu \mathsf{S}iu \mathsf{T}iu \mathsf{U}iu \mathsf{V}iu \mathsf{W}iu \mathsf{X}iu \mathsf{Y}iu \mathsf{Z}iu \mathsf{a}iu \mathsf{b}iu \mathsf{c}iu \mathsf{d}iu \mathsf{e}iu \mathsf{f}iu \mathsf{g}iu \mathsf{h}iu \mathsf{i}iu \mathsf{j}iu \mathsf{k}iu \mathsf{l}iu \mathsf{m}iu \mathsf{n}iu \mathsf{o}iu \mathsf{p}iu \mathsf{q}iu \mathsf{r}iu \mathsf{s}iu \mathsf{t}iu \mathsf{u}iu \mathsf{v}iu \mathsf{w}iu \mathsf{x}iu \mathsf{y}iu \mathsf{z}iu \mathtt{A}ipu \mathtt{B}iqu \mathtt{C}iru \mathtt{D}isu \mathtt{E}itu \mathtt{F}iuu \mathtt{G}ivu \mathtt{H}iwu \mathtt{I}ixu \mathtt{J}iyu \mathtt{K}izu \mathtt{L}i{u \mathtt{M}i|u \mathtt{N}i}u \mathtt{O}i~u \mathtt{P}iu \mathtt{Q}iu \mathtt{R}iu \mathtt{S}iu \mathtt{T}iu \mathtt{U}iu \mathtt{V}iu \mathtt{W}iu \mathtt{X}iu \mathtt{Y}iu \mathtt{Z}iu \mathtt{a}iu \mathtt{b}iu \mathtt{c}iu \mathtt{d}iu \mathtt{e}iu \mathtt{f}iu \mathtt{g}iu \mathtt{h}iu \mathtt{i}iu \mathtt{j}iu \mathtt{k}iu \mathtt{l}iu \mathtt{m}iu \mathtt{n}iu \mathtt{o}iu \mathtt{p}iu \mathtt{q}iu \mathtt{r}iu \mathtt{s}iu \mathtt{t}iu \mathtt{u}iu \mathtt{v}iu \mathtt{w}iu \mathtt{x}iu \mathtt{y}iu \mathtt{z}iiiu\mathbf{\Gamma}iu\mathbf{\Delta}iu\mathbf{\Theta}iu\mathbf{\Lambda}iu \mathbf{\Xi}iu \mathbf{\Pi}iu\mathbf{\Sigma}iu\mathbf{\Upsilon}iu \mathbf{\Phi}iu \mathbf{\Psi}iu\mathbf{\Omega}iu\mathit{\Gamma}iu\mathit{\Delta}iu\mathit{\Theta}iu\mathit{\Lambda}iu \mathit{\Xi}iu \mathit{\Pi}iu\mathit{\Sigma}iu\mathit{\Upsilon}iu \mathit{\Phi}iu \mathit{\Psi}iu\mathit{\Omega}iiiiiiiiiiiiiii i i i iiiiiiiiu \epsilon iiu \varkappa iiu\varrho iiu \mathbf{0}iu \mathbf{1}iu \mathbf{2}iu \mathbf{3}iu \mathbf{4}iu \mathbf{5}iu \mathbf{6}iu \mathbf{7}iu \mathbf{8}iu \mathbf{9}iu \mathsf{0}iu \mathsf{1}iu \mathsf{2}iu \mathsf{3}iu \mathsf{4}iu \mathsf{5}iu \mathsf{6}iu \mathsf{7}iu \mathsf{8}iu \mathsf{9}iu \mathtt{0}iu \mathtt{1}iu \mathtt{2}iu \mathtt{3}iu \mathtt{4}iu \mathtt{5}iu \mathtt{6}iu \mathtt{7}iu \mathtt{8}iu \mathtt{9}iN(t uni2tex_table(((sC/tmp/pip-install-usGedi/docutils/docutils/utils/math/unichar2tex.pyts