English

On Darboux Integrable Semi-Discrete Chains

Exactly Solvable and Integrable Systems 2011-02-09 v2

Abstract

Differential-difference equation ddxt(n+1,x)=f(x,t(n,x),t(n+1,x),ddxt(n,x))\frac{d}{dx}t(n+1,x)=f(x,t(n,x),t(n+1,x),\frac{d}{dx}t(n,x)) with unknown t(n,x)t(n,x) depending on continuous and discrete variables xx and nn is studied. We call an equation of such kind Darboux integrable, if there exist two functions (called integrals) FF and II of a finite number of dynamical variables such that DxF=0D_xF=0 and DI=IDI=I, where DxD_x is the operator of total differentiation with respect to xx, and DD is the shift operator: Dp(n)=p(n+1)Dp(n)=p(n+1). It is proved that the integrals can be brought to some canonical form. A method of construction of an explicit formula for general solution to Darboux integrable chains is discussed and for a class of chains such solutions are found.

Keywords

Cite

@article{arxiv.1002.0988,
  title  = {On Darboux Integrable Semi-Discrete Chains},
  author = {Ismagil Habibullin and Natalya Zheltukhina and Alfia Sakieva},
  journal= {arXiv preprint arXiv:1002.0988},
  year   = {2011}
}

Comments

19 pages

R2 v1 2026-06-21T14:43:23.670Z