Flat structure and potential vector fields related with algebraic solutions to  Painlevé VI equation

Mitsuo Kato; Toshiyuki Mano; Jiro Sekiguchi

doi:10.7494/OpMath.2018.38.2.201

Opuscula Mathematica (Jan 2018)

Flat structure and potential vector fields related with algebraic solutions to Painlevé VI equation

Mitsuo Kato,
Toshiyuki Mano,
Jiro Sekiguchi

Affiliations

Mitsuo Kato: University of the Ryukyus, Colledge of Educations, Department of Mathematics, Nishihara-cho, Okinawa 903-0213, Japan
Toshiyuki Mano: University of the Ryukyus, Faculty of Science, Department of Mathematical Sciences, Nishihara-cho, Okinawa 903-0213, Japan
Jiro Sekiguchi: Tokyo University of Agriculture and Technology, Faculty of Engineering, Department of Mathematics, Koganei, Tokyo 184-8588, Japan

DOI: https://doi.org/10.7494/OpMath.2018.38.2.201
Journal volume & issue: Vol. 38, no. 2
pp. 201 – 252

Abstract

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A potential vector field is a solution of an extended WDVV equation which is a generalization of a WDVV equation. It is expected that potential vector fields corresponding to algebraic solutions of Painlevé VI equation can be written by using polynomials or algebraic functions explicitly. The purpose of this paper is to construct potential vector fields corresponding to more than thirty non-equivalent algebraic solutions.

Published in Opuscula Mathematica

ISSN: 1232-9274 (Print); 2300-6919 (Online)
Publisher: AGH Univeristy of Science and Technology Press
Country of publisher: Poland
LCC subjects: Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods
Website: http://www.opuscula.agh.edu.pl/

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