On Hamiltonian flows whose orbits are straight lines

Abstract

We consider real analytic Hamiltonians whose flow depends linearly on time. Trivial examples are Hamiltonians H(q,p) that do not depend on the coordinate q. By a theorem of Moser, every polynomial Hamiltonian of degree 3 reduces to such a q-independent Hamiltonian via a linear symplectic change of variables. We show that such a reduction is impossible, in general, for polynomials of degree 4 or higher. But we give a condition that implies linear-symplectic conjugacy to another simple class of Hamiltonians. The condition is shown to hold for all nondegenerate Hamiltonians that are homogeneous of degree 4.