Generically, Arnold-Liouville Systems Cannot be Bi-Hamiltonian

Abstract

We state and prove that a certain class of smooth functions said to be BH-separable is a meagre subset for the Fr\'echet topology. Because these functions are the only admissible Hamiltonians for Arnold-Liouville systems admitting a bi-Hamiltonian structure, we get that, generically, Arnold-Liouville systems cannot be bi-Hamiltonian. At the end of the paper, we determine, both as a concrete representation of our general result and as an illustrative list, which polynomial Hamiltonians H of the form H(x,y)=xy+ax3+bx2y+cxy2+dy3 are BH-separable.