Hamiltonian vector fields of homogeneous polynomials in two variables

Abstract

Let g:R2 be a homogeneous polynomial of degree p>1, G=(-g'y, g'x) be its Hamiltonian vector field, and Gt be the local flow generated by G. Denote by E(G,O) the space of germs of C∞ diffeomorphisms (R2,O)(R2,O) that preserve orbits of G. Let also Eid(G,O) be the identity component of E(G,O) with respect to C1-topology. Suppose that g has no multiple prime factors. Then we prove that for every h∈ Eid(G,O) there exists a germ of a smooth function α:R2 at O such that h(z)=Gα(z)(z).