On Darboux Integrable Semi-Discrete Chains

Abstract

Differential-difference equation ddxt(n+1,x)=f(x,t(n,x),t(n+1,x),ddxt(n,x)) with unknown t(n,x) depending on continuous and discrete variables x and n is studied. We call an equation of such kind Darboux integrable, if there exist two functions (called integrals) F and I of a finite number of dynamical variables such that DxF=0 and DI=I, where Dx is the operator of total differentiation with respect to x, and D is the shift operator: 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.