Any Baumslag-Solitar action on surfaces with a pseudo-Anosov element has a finite orbit

Abstract

We consider f, h homeomorphims generating a faithful BS(1,n)-action on a closed surface S, that is, h f h-1 = fn, for some n≥ 2. According to GL, after replacing f by a suitable iterate if necessary, we can assume that there exists a minimal set of the action, included in Fix(f). Here, we suppose that f and h are C1 in neighbourhood of and any point x∈ admits an h-unstable manifold Wu(x). Using Bonatti's techniques, we prove that either there exists an integer N such that Wu(x) is included in Fix(fN) or there is a lower bound for the norm of the differential of h only depending on n and the Riemannian metric on S. Combining last statement with a result of AGX, we show that any faithful action of BS(1, n) on S with h a pseudo-Anosov homeomorphism has a finite orbit. As a consequence, there is no faithful C1-action of BS(1, n) on the torus with h an Anosov.