Polishability of some groups of interval and circle diffeomorphisms

Abstract

Let M=I or M=S1 and let k≥ 1. We exhibit a new infinite class of Polish groups by showing that each group Diff+k+AC(M), consisting of those Ck diffeomorphisms whose k-th derivative is absolutely continuous, admits a natural Polish group topology which refines the subspace topology inherited from Diff+k(M). By contrast, the group Diff+1+BV(M), consisting of C1 diffeomorphisms whose derivative has bounded variation, admits no Polish group topology whatsoever.