Solving the cohomological equation for locally hamiltonian flows, part II -- global obstructions

Abstract

Continuing the research initiated in Fr-Ki2, we study the existence of solutions and their regularity for the cohomological equations X u=f for locally Hamiltonian flows (determined by the vector field X) on a compact surface M of genus g≥ 1. We move beyond the case studied so far by Forni in Fo1,Fo3, when the flow is minimal over the entire surface and the function f satisfies some Sobolev regularity conditions. We deal with the flow restricted to any its minimal component and any smooth function f whenever the flow satisfies the Full Filtration Diophantine Condition (FFDC) (this is a full measure condition). The main goal of this article is to quantify optimal regularity of solutions. For this purpose we construct a family of invariant distributions F t, t∈TF* that play the roles of the Forni's invariant distributions introduced in Fo1,Fo3 by using the language of translation surfaces. The distributions F t are global in nature (as emphasized in the title of the article), unlike the distributions dkσ,j, (σ,k,j)∈TD and Ckσ,l, (σ,k,l)∈TC introduced in Fr-Ki2, which are defined locally. All three families are used to determine the optimal regularity of the solutions for the cohomological equation, see Theorem 1.1 and 1.2. As a by-product, we also obtained, interesting in itself, a spectral result (Theorem 1.3) for the Kontsevich-Zorich cocycle acting on functional spaces arising naturally at the transition to the first-return map.