Multiple Rotation Type Solutions for Hamiltonian Systems on T×R2n-

Abstract

This paper deals with multiplicity of rotation type solutions for Hamiltonian systems on T× R2n-. It is proved that, for every spatially periodic Hamiltonian system, i.e., the case =n, there exist at least n+1 geometrically distinct rotation type solutions with given energy rotation vector. It is also proved that, for a class of Hamiltonian systems on T×R2n- with 1≤slant≤slant 2n-1 but ≠ n, there exists at least one periodic solution or n+1 rotation type solutions on every contact energy hypersurface.