A simple way of making a Hamiltonian system into a bi-Hamiltonian one
Abstract
Given a Poisson structure (or, equivalently, a Hamiltonian operator) P, we show that its Lie derivative Lτ(P) along a vector field τ defines another Poisson structure, which is automatically compatible with P, if and only if [Lτ2(P),P]=0, where [·,·] is the Schouten bracket. We further prove that if P≤ 1 and P is of locally constant rank, then all Poisson structures compatible with a given Poisson structure P on a finite-dimensional manifold M are locally of the form Lτ(P), where τ is a local vector field such that Lτ2(P)=Lτ(P) for some other local vector field τ. This leads to a remarkably simple construction of bi-Hamiltonian dynamical systems. We also present a generalization of these results to the infinite-dimensional case. In particular, we provide a new description for pencils of compatible local Hamiltonian operators of Dubrovin--Novikov type and associated bi-Hamiltonian systems of hydrodynamic type. Key words: compatible Poisson structures, Hamiltonian operators, bi-Hamiltonian systems (= bihamiltonian systems), integrability, Schouten bracket, master symmetry, Lichnerowicz--Poisson cohomology, hydrodynamic type systems. MSC 2000: Primary: 37K10; Secondary: 37K05, 37J35
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