LaTeX to CAS translator

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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 \zeta(s)=\sum_{n=1}^{\infty}\frac{1}{n^s}. }

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

Semantic latex: \Riemannzeta@{s} = \sum_{n=1}^{\infty} \frac{1}{n^s}

Confidence: 0.90419950349709

Mathematica

Translation: Zeta[s] == Sum[Divide[1,(n)^(s)], {n, 1, Infinity}, GenerateConditions->None]

Information

Sub Equations

  • Zeta[s] = Sum[Divide[1,(n)^(s)], {n, 1, Infinity}, GenerateConditions->None]

Free variables

  • s

Symbol info

  • Riemann zeta function; Example: \Riemannzeta@{s}

Will be translated to: Zeta[$0] Relevant links to definitions: DLMF: http://dlmf.nist.gov/25.2#E1 Mathematica: https://reference.wolfram.com/language/ref/Zeta.html

Tests

Symbolic

Test expression: (Zeta[s])-(Sum[Divide[1,(n)^(s)], {n, 1, Infinity}, GenerateConditions->None])

ERROR: 

{
    "result": "ERROR",
    "testTitle": "Simple",
    "testExpression": null,
    "resultExpression": null,
    "wasAborted": false,
    "conditionallySuccessful": false
}
Numeric

SymPy

Translation:

Information

Symbol info

  • (LaTeX -> SymPy) No translation possible for given token: Cannot extract information from feature set: \Riemannzeta [\Riemannzeta]

Tests

Symbolic
Numeric

Maple

Translation: Zeta(s) = sum((1)/((n)^(s)), n = 1..infinity)

Information

Sub Equations

  • Zeta(s) = sum((1)/((n)^(s)), n = 1..infinity)

Free variables

  • s

Symbol info

  • Riemann zeta function; Example: \Riemannzeta@{s}

Will be translated to: Zeta($0) Relevant links to definitions: DLMF: http://dlmf.nist.gov/25.2#E1 Maple: https://www.maplesoft.com/support/help/maple/view.aspx?path=Zeta

Tests

Symbolic
Numeric

Dependency Graph Information

Includes

Description

  • Riemann Zeta function

Complete translation information: 

{
  "id" : "FORMULA_52ab3c7f65d3aeb6ec9e38217a334dc1",
  "formula" : "\\zeta(s)=\\sum_{n=1}^{\\infty}\\frac{1}{n^s}",
  "semanticFormula" : "\\Riemannzeta@{s} = \\sum_{n=1}^{\\infty} \\frac{1}{n^s}",
  "confidence" : 0.9041995034970904,
  "translations" : {
    "Mathematica" : {
      "translation" : "Zeta[s] == Sum[Divide[1,(n)^(s)], {n, 1, Infinity}, GenerateConditions->None]",
      "translationInformation" : {
        "subEquations" : [ "Zeta[s] = Sum[Divide[1,(n)^(s)], {n, 1, Infinity}, GenerateConditions->None]" ],
        "freeVariables" : [ "s" ],
        "tokenTranslations" : {
          "\\Riemannzeta" : "Riemann zeta function; Example: \\Riemannzeta@{s}\nWill be translated to: Zeta[$0]\nRelevant links to definitions:\nDLMF:         http://dlmf.nist.gov/25.2#E1\nMathematica:  https://reference.wolfram.com/language/ref/Zeta.html"
        }
      },
      "numericResults" : {
        "overallResult" : "SKIPPED",
        "numberOfTests" : 0,
        "numberOfFailedTests" : 0,
        "numberOfSuccessfulTests" : 0,
        "numberOfSkippedTests" : 0,
        "numberOfErrorTests" : 0,
        "wasAborted" : false,
        "crashed" : false,
        "testCalculationsGroups" : [ ]
      },
      "symbolicResults" : {
        "overallResult" : "ERROR",
        "numberOfTests" : 1,
        "numberOfFailedTests" : 0,
        "numberOfSuccessfulTests" : 0,
        "numberOfSkippedTests" : 0,
        "numberOfErrorTests" : 1,
        "crashed" : false,
        "testCalculationsGroup" : [ {
          "lhs" : "Zeta[s]",
          "rhs" : "Sum[Divide[1,(n)^(s)], {n, 1, Infinity}, GenerateConditions->None]",
          "testExpression" : "(Zeta[s])-(Sum[Divide[1,(n)^(s)], {n, 1, Infinity}, GenerateConditions->None])",
          "testCalculations" : [ {
            "result" : "ERROR",
            "testTitle" : "Simple",
            "testExpression" : null,
            "resultExpression" : null,
            "wasAborted" : false,
            "conditionallySuccessful" : false
          } ]
        } ]
      }
    },
    "SymPy" : {
      "translation" : "",
      "translationInformation" : {
        "tokenTranslations" : {
          "Error" : "(LaTeX -> SymPy) No translation possible for given token: Cannot extract information from feature set: \\Riemannzeta [\\Riemannzeta]"
        }
      }
    },
    "Maple" : {
      "translation" : "Zeta(s) = sum((1)/((n)^(s)), n = 1..infinity)",
      "translationInformation" : {
        "subEquations" : [ "Zeta(s) = sum((1)/((n)^(s)), n = 1..infinity)" ],
        "freeVariables" : [ "s" ],
        "tokenTranslations" : {
          "\\Riemannzeta" : "Riemann zeta function; Example: \\Riemannzeta@{s}\nWill be translated to: Zeta($0)\nRelevant links to definitions:\nDLMF:  http://dlmf.nist.gov/25.2#E1\nMaple: https://www.maplesoft.com/support/help/maple/view.aspx?path=Zeta"
        }
      }
    }
  },
  "positions" : [ {
    "section" : 5,
    "sentence" : 2,
    "word" : 9
  } ],
  "includes" : [ "\\, \\zeta(x)" ],
  "isPartOf" : [ ],
  "definiens" : [ {
    "definition" : "Riemann Zeta function",
    "score" : 0.7125985104912714
  } ]
}

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