A Few Integrable Dynamical Systems, Recurrence Operators, Expanding Integrable Models and Hamiltonian Structures by the r-Matrix Method

摘要

We extend two known dynamical systems obtained by Blaszak,et al.via choosing Casimir functions and utilizing Novikov-Lax equation so that a series of novel dynamical systems including generalized Burgers dynamical system,heat equation,and so on,are followed to be generated.Then we expand some differential operators presented in the paper to deduce two types of expanding dynamical models.By taking the generalized Burgers dynamical system as an example,we deform its expanding model to get a half-expanding system,whose recurrence operator is derived from Lax representation,and its Hamiltonian structure is also obtained by adopting a new way.Finally,we expand the generalized Burgers dynamical system to the (2+1)-dimensional case whose Hamiltonian structure is derived by Poisson tensor and gradient of the Casimir function.Besides,a kind of (2+-1)-dimensional expanding dynamical model of the (2+1)-dimensional dynamical system is generated as well.