Integrable structures of dispersionless systems and differential geometry

A. V. Odesskii

doi:10.1134/S0040577917050105

Integrable structures of dispersionless systems and differential geometry

Authors: Odesskii A.V.¹
Affiliations:
1. Brock University
Issue: Vol 191, No 2 (2017)
Pages: 692-709
Section: Article
URL: https://journals.rcsi.science/0040-5779/article/view/171213
DOI: https://doi.org/10.1134/S0040577917050105
ID: 171213

Cite item

Full Text

Open Access
Restricted Access

Access granted
Restricted Access

Subscription Access

Abstract
About the authors
References
Supplementary files
Statistics

Abstract

We develop the theory of Whitham-type hierarchies integrable by hydrodynamic reductions as a theory of certain differential-geometric objects. As an application, we construct Gibbons–Tsarev systems associated with the moduli space of algebraic curves of arbitrary genus and prove that the universal Whitham hierarchy is integrable by hydrodynamic reductions.

Keywords

integrability of quasilinear systems, hydrodynamic reduction, Gibbons–Tsarev system, Whitham-type hierarchy, moduli space of Riemann surfaces

About the authors

A. V. Odesskii

Brock University

Author for correspondence.
Email: aodesski@brocku.ca
Canada, St. Catharines

Supplementary files

Supplementary Files

Action

1. JATS XML

Download

Username
Password
Remember me

Forgot password?	Register

Username
Password
Remember me

Forgot password?	Register