LaTeX to CAS translator

This mockup demonstrates the concept of TeX to Computer Algebra System (CAS) conversion.

The demo-application converts LaTeX functions which directly translate to CAS counterparts.

Functions without explicit CAS support are available for translation via a DRMF package (under development).

The following LaTeX input ...

{\displaystyle \Phi(z,s,a)=\sum_{k=0}^n \frac{z^k}{(a+k)^s} +z^n\sum_{m=0}^\infty (1-m-s)_{m}\operatorname{Li}_{s+m}(z)\frac{(a+n)^m}{m!};\ a\rightarrow-n }

${\displaystyle {\displaystyle \Phi (z,s,a)=\sum _{k=0}^{n}{\frac {z^{k}}{(a+k)^{s}}}+z^{n}\sum _{m=0}^{\infty }(1-m-s)_{m}\operatorname {Li} _{s+m}(z){\frac {(a+n)^{m}}{m!}};\ a\rightarrow -n}}$

... is translated to the CAS output ...

Semantic latex: \Phi(z , s , a) = \sum_{k=0}^n \frac{z^k}{(a+k)^s} + z^n \sum_{m=0}^\infty \Pochhammersym{1 - m - s}{m} \polylog{s+m}@{z} \frac{(a+n)^m}{m!} ; a \rightarrow - n

Confidence: 0.69438023833609

Mathematica

Translation:

Information

Tests

Symbolic

Numeric

SymPy

Translation:

Information

Tests

Symbolic

Numeric

Maple

Translation:

Information

Tests

Symbolic

Numeric

Dependency Graph Information

{
  "id" : "FORMULA_35ea453e0941396f1a60a268534fa9ce",
  "formula" : "\\Phi(z,s,a)=\\sum_{k=0}^n \\frac{z^k}{(a+k)^s}\n+z^n\\sum_{m=0}^\\infty (1-m-s)_{m}\\operatorname{Li}_{s+m}(z)\\frac{(a+n)^m}{m!};a\\rightarrow-n",
  "semanticFormula" : "\\Phi(z , s , a) = \\sum_{k=0}^n \\frac{z^k}{(a+k)^s} + z^n \\sum_{m=0}^\\infty \\Pochhammersym{1 - m - s}{m} \\polylog{s+m}@{z} \\frac{(a+n)^m}{m!} ; a \\rightarrow - n",
  "confidence" : 0.694380238336087,
  "translations" : {
    "Mathematica" : {
      "translation" : "",
      "translationInformation" : {
        "tokenTranslations" : {
          "Error" : "(LaTeX -> Mathematica) No translation possible for given token: Unknown relation. Cannot translate: \\rightarrow [\\rightarrow]"
        }
      }
    },
    "SymPy" : {
      "translation" : "",
      "translationInformation" : {
        "tokenTranslations" : {
          "Error" : "(LaTeX -> SymPy) No translation possible for given token: Cannot extract information from feature set: \\Pochhammersym [\\Pochhammersym]"
        }
      }
    },
    "Maple" : {
      "translation" : "",
      "translationInformation" : {
        "tokenTranslations" : {
          "Error" : "(LaTeX -> Maple) No translation possible for given token: Unknown relation. Cannot translate: \\rightarrow [\\rightarrow]"
        }
      }
    }
  },
  "positions" : [ ],
  "includes" : [ "a", "\\Phi(z,s,a)", "\\operatorname{Li}_s(z)", "z", "s", "\\mathrm{Li}_n(z)", "\\Phi(z,s,a)=\\sum_{k=0}^n \\frac{z^k}{(a+k)^s}+z^n\\sum_{m=0}^\\infty (1-m-s)_{m}\\operatorname{Li}_{s+m}(z)\\frac{(a+n)^m}{m!};\\ a\\rightarrow-n" ],
  "isPartOf" : [ "\\Phi(z,s,a)=\\sum_{k=0}^n \\frac{z^k}{(a+k)^s}+z^n\\sum_{m=0}^\\infty (1-m-s)_{m}\\operatorname{Li}_{s+m}(z)\\frac{(a+n)^m}{m!};\\ a\\rightarrow-n" ],
  "definiens" : [ ]
}