Elementary equivalence and diffeomorphism groups of smooth manifolds

Abstract

Let M and N be smooth manifolds, with M closed and connected. If the Cr--diffeomorphism group of M is elementarily equivalent to the Cs--diffeomorphism group of N for some r,s∈[1,∞)\0,∞\, then r=s and M and N are Cr--diffeomorphic. This strengthens a previously known result by Takens and Filipkiewicz, which asserts that for integer regularities, a group isomorphism between diffeomorphism groups of closed manifolds necessarily arises from a diffeomorphism of the underlying manifolds. We prove an analogous result for groups of diffeomorphisms preserving smooth volume forms, in dimension at least two.