Rigidity in topology C0 of the Poisson bracket for Tonelli Hamiltonians

Abstract

We prove the following rigidity result for the Tonelli Hamiltonians. Let T * M be the cotangent bundle of a closed manifold M endowed with its usual symplectic form. Let (F\n) be a sequence of Tonelli Hamiltonians that C0 converges on the compact subsets to a Tonelli Hamiltonian F. Let (G\n) be a sequence of Hamiltonians that that C0 converges on the compact subsets to a Hamiltonian G. We assume that the sequence of the Poisson brackets (F\n , G\n ) C0-converges on the compact subsets to a C1 function H. Then H = F, G.