Differential-difference equations associated with the fractional Lax operators

Abstract

We study integrable hierarchies associated with spectral problems of the form P=λ Q where P,Q are difference operators. The corresponding nonlinear differential-difference equations can be viewed as inhomogeneous generalizations of the Bogoyavlensky type lattices. While the latter turn into the Korteweg--de Vries equation under the continuous limit, the lattices under consideration provide discrete analogs of the Sawada--Kotera and Kaup--Kupershmidt equations. The r-matrix formulation and several simplest explicit solutions are presented.