Variational Operators, Symplectic Operators, and the Cohomology of Scalar Evolution Equations

Abstract

For a scalar evolution equation ut=K(t,x,u,ux,…, un), n≥ 2 the cohomology spaces H1,s( R∞) vanishes for s≥ 3 while the space H1,2( R∞) is isomorphic to the space of variational operators. The cohomology space H1,2( R∞) is also shown to be isomorphic to the space of symplectic operators for ut=K for which the equation is Hamiltonian. Third order scalar evolution equations admitting a first order symplectic (or variational) operator are characterized. The symplectic nature of the potential form of a bi-Hamiltonian evolution equation is also presented.