Computing periods of rational integrals

Pierre Lairez

doi:10.1090/mcom/3054

Computing periods of rational integrals

Pierre Lairez

TU Berlin

Research output: Contribution to journal › Article › peer-review

Abstract

A period of a rational integral is the result of integrating, with respect to one or several variables, a rational function over a closed path. This work focuses particularly on periods depending on a parameter: In this case the period under consideration satisfies a linear differential equation, the Picard-Fuchs equation. I give a reduction algorithm that extends the Griffiths- Dwork reduction and apply it to the computation of Picard-Fuchs equations. The resulting algorithm is elementary and has been successfully applied to problems that were previously out of reach.

Original language	English
Pages (from-to)	1719-1752
Number of pages	34
Journal	Mathematics of Computation
Volume	85
Issue number	300
DOIs	https://doi.org/10.1090/mcom/3054
Publication status	Published - 1 Jan 2016
Externally published	Yes

Keywords

Algorithms
Griffiths-Dwork reduction
Integration
Periods
Picard-Fuchs equation

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10.1090/mcom/3054

Cite this

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abstract = "A period of a rational integral is the result of integrating, with respect to one or several variables, a rational function over a closed path. This work focuses particularly on periods depending on a parameter: In this case the period under consideration satisfies a linear differential equation, the Picard-Fuchs equation. I give a reduction algorithm that extends the Griffiths- Dwork reduction and apply it to the computation of Picard-Fuchs equations. The resulting algorithm is elementary and has been successfully applied to problems that were previously out of reach.",

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AB - A period of a rational integral is the result of integrating, with respect to one or several variables, a rational function over a closed path. This work focuses particularly on periods depending on a parameter: In this case the period under consideration satisfies a linear differential equation, the Picard-Fuchs equation. I give a reduction algorithm that extends the Griffiths- Dwork reduction and apply it to the computation of Picard-Fuchs equations. The resulting algorithm is elementary and has been successfully applied to problems that were previously out of reach.

KW - Algorithms

KW - Griffiths-Dwork reduction

KW - Integration

KW - Periods

KW - Picard-Fuchs equation

UR - https://www.scopus.com/pages/publications/84961782135

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DO - 10.1090/mcom/3054

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VL - 85

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EP - 1752

JO - Mathematics of Computation

JF - Mathematics of Computation

IS - 300

ER -

Computing periods of rational integrals

Abstract

Keywords

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