demo
Result |
LaTeX |
AsciiMath |
maSpace |
$\frac{a+b}{c}$ |
\frac{a+b}{c} |
(a+b)/c |
a+b /c (a+b␣/c ) |
$a+\frac{b}{c}$ |
a+\frac{b}{c} |
a+b/c |
a+b/c |
$a_{b^c}$ |
a_{b^c} |
a_(b^c) |
a _b^c (a␣_b^c ) |
$a_b^c$ |
a_b^c |
a_b^c |
a_b^c |
$\frac{a_{b_c}^{d^{e+f}_g}}{h}$ |
\frac{a_{b_c}^{d^{e+f}_g}}{h} |
a_[b_c]^[d_g^[e+f]]/h |
a _b_c ^d ^e+f _g /h (a␣_b_c␣␣^d␣^e+f␣_g␣␣/h ) |
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a _b_c ^d^[e+f]_g /h (a␣_b_c␣^d^[e+f]_g␣/h ) |
$a_{b_c^d}^{e+f_{\frac{g}{h}}}$ |
a_{b_c^d}^{e+f_{\frac{g}{h}}} |
a_[b_c^d]^[e+f_[g/h]] |
a _b_c^d ^[e+f _g/h] (a␣_b_c^d␣^[e+f␣_g/h] ) |
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a _b_c^d ^e+f _g/h (a␣_b_c^d␣␣^e+f␣_g/h ) |
$a_{b_{c^d}}^e+\frac{f_g}{h}$ |
a_{b_{c^d}}^e+\frac{f_g}{h} |
a_[b_[c^d]]^[e]+[f_g]/h |
a _b _c^d ^e + f_g/h (a␣␣_b␣_c^d␣␣^e␣␣+␣␣f_g/h ) |
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a _b _c^d ^e + f_g/h (a␣␣_b␣_c^d␣␣^e␣+␣f_g/h ) |
$a$ |
a |
a |
a |
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<a> |
$\hat a$ |
\hat a |
hat a |
â |
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<'hat>a |
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<'hat><a> |
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<a hat> |
$\alpha'$ |
\alpha' |
alpha' |
α' |
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<alpha>' |
$\not\hat\alpha$ |
\not\hat\alpha |
cancel hat alpha |
<alpha hat not> |
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<alpha hat!> |
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<α hat !> |
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<α̂!> |
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<'not><'hat><alpha> |
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α̸̂ |
$\infty$ |
\infry |
infty |
<infty> |
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oo |
`oo` |
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∞ |
$\dot\infty$ |
\dot\infty |
dot infty |
<infty dot> |
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dot oo |
<`oo` dot> |
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<∞ dot> |
$<$ |
< |
< |
`<` |
$\not<$ |
\not< |
cancel < |
<`<` not> |
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≮ |
$\sqrt{2}$ |
\sqrt{2} |
sqrt 2 |
<'sqrt>2 |
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sqrt[2] |
<'sqrt>[2] |
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√2 |
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`_/`2 |
$\sqrt[3]{123}$ |
\sqrt[3]{123} |
root 3 123 |
3 _/ 123 |
$\sqrt{3+4}$ |
\sqrt{3+4} |
sqrt[3+4] |
√ 3+4 |
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√[3+4] |
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<'sqrt> 3+4 |
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<'sqrt>[3+4] |
$\lVert a \rVert$ |
\lVert a \rVert |
norm(a) |
<'norm>a |
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`[||` a `||]` |
$\mathrm{abc}$ |
\mathrm{abc} |
"abc" |
<"abc" rm> |
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"abc" |
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<"abc"> |
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<##"abc"## rm> |
$\mathbf{ab\#"c}$ |
\mathbf{ab#"c} |
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<r##"ab"#c"## bf> |
- NFD normalization
- remove leading and trailing spaces
- tokenize
- insert virtual cat⁰ between connected symbols with no spaces
- transform unicode_sub and unicode_sup to ASCII
mathⁱ = rootⁱ, [' 'ⁱ, rootⁱ];
rootⁱ = fracⁱ, ['_/'ⁱ, fracⁱ];
fracⁱ = stackⁱ, ['/'ⁱ, stackⁱ];
stackⁱ = interⁱ, ['^^'ⁱ, interⁱ], ['__'ⁱ, interⁱ];
interⁱ = simpⁱ, ['^'ⁱ simpⁱ], ['_'ⁱ simpⁱ];
simpⁱ = [opⁱ,] mathⁱ⁻¹;
simp⁰ = [op⁰,] (symbol | open, mathᵒᵒ, close);
a␣_b_c␣␣^d␣^e+f␣_g␣␣/h
"a" Sub(1) "b" Sub(0) "c" Sup(2) "d" Sup(1) "e" Cat(0) "+" Cat(0) "f" Sub(1) "g" Frac(2) "h"
-----------------------------------frac2---------------------------------------- "h"
---simp2----------------- --------------simp2----------------------------
---math1----------------- --------------math1----------------------------
"a" ---simp1------ "d" --------simp1------------ "g"
---math0------ --------math0------------
"b" "c" "e" "+" "f"
a␣_b_c^d␣␣^e+f␣_g/h
"a" Sub(1) "b" Sub(0) "c" Sup(0) "d" Sup(2) "e" Cat(0) "+" Cat(0) "f" Sub(1) "g" Frac(0) "h"
-------------simp2------------------ --------------------simp2-----------------------
-------------math1------------------ --------------------math1-----------------------
"a" --------simp1------------ ----------simp1---------- ----simp1------
--------math0------------ ----------math0---------- ----math0------
"b" "c" "d" "e" "+" "f" "g" "h"
a␣_b_c^d␣^[e+f␣_g/h]
"a" Sub(1) "b" Sub(0) "c" Sup(0) "d" Sup(1) Open(".") "e" Cat(0) "+" Cat(0) "f" Sub(1) "g" Frac(0) "h" Close(".")
"a" ---------simp1----------- ---------------------------------simp1-------------------------------
"b" "c" "d" ---------------------------------math0-------------------------------
---------------------------------math-1------------------------------
-----------------------math1--------------------
----------simp1---------- ----simp1------
"e" "+" "f" "g" "h"