N-dimensional lattice integrable systems and their bi-Hamiltonian structure on the time scale using the R-matrix approach

Yong FANG, Xue SANG, Man Wai YUEN, Yong ZHANG

Research output: Contribution to journalArticlespeer-review

Abstract

A time scale is a special measure chain that can unify continuous and discrete spaces, enabling the construction of integrable equations. In this paper, with the Lax operator generated by the displacement operator, N-dimensional lattice integrable systems on the time scale are given by the R-matrix approach. The recursion operators of the lattice systems are derived on the time scale. Finally, two integrable hierarchies of the discrete chain with a bi-Hamiltonian structure are obtained. In particular, we give the structure of two-field and four-field systems. Copyright © 2024 by the authors.
Original languageEnglish
Article number136
JournalAxioms
Volume13
Issue number3
DOIs
Publication statusPublished - Feb 2024

Citation

Fang, Y., Sang, X., Yuen, M., & Zhang, Y. (2024). N-dimensional lattice integrable systems and their bi-Hamiltonian structure on the time scale using the R-matrix approach. Axioms, 13(3), Article 136. https://doi.org/10.3390/axioms13030136

Keywords

  • N-dimensional lattice integrable systems
  • Time scale
  • R-matrix approach
  • bi-Hamiltonian structure

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