Establishment of a signed ultra-discretization method and its application to integrable systems View Homepage


Ontology type: schema:MonetaryGrant     


Grant Info

YEARS

2014-2018

FUNDING AMOUNT

4030000 JPY

ABSTRACT

We aim to summarize research results on signed hyper discretization of nonlinear spring equations in a paper. In the study plan, we study the fundamental properties of "hyper discrete determinant" on the signed superdiscretization of matrix formulas and its application to integrable systems, as well as prior research on application of permanent to integrable systems We aim to compare and obtain certain knowledge. More... »

URL

https://kaken.nii.ac.jp/grant/KAKENHI-PROJECT-26790082

Related SciGraph Publications

  • 2019-01. Ultradiscrete analogues of the hard-spring equation and its conserved quantity in JAPAN JOURNAL OF INDUSTRIAL AND APPLIED MATHEMATICS
  • 2017-08. Bessel function type solutions of the ultradiscrete Painlev√© III equation with parity variables in JAPAN JOURNAL OF INDUSTRIAL AND APPLIED MATHEMATICS
  • 2016-02. Nonlinear Kalman filtering via ultradiscretization procedure in JAPAN JOURNAL OF INDUSTRIAL AND APPLIED MATHEMATICS
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