Towards Ivanov's meta-conjecture for geodesic currents

Abstract

Given a closed, orientable surface S of negative Euler characteristic, we study two automorphism groups: Aut(C) and Aut(ML), groups of homeomorphisms that preserve the intersection form in the space C of geodesic currents and the space ML of measured laminations. We prove that except in a few special cases, Aut(ML) is isomorphic to the extended mapping class group. This theorem is a special case of Ivanov's meta-conjecture. We investigate this question for Aut(C). To demonstrate the difficulty in proving Ivanov's conjecture for Aut(C), we construct infinite family of pairs of closed curves that have the simple same marked length spectra and self intersection number.