Approximation and zero set of definable functions in a definably complete locally o-minimal structure

Abstract

We consider a definably complete locally o-minimal expansion of an ordered field. We treat two topics in this paper. The first topic is a definable Cr approximation of a definable Cr-1 map between definable Cr submanifolds in the definable Cr-1 topology. The second topic is the imbedding theorem for definably compact definable Cr manifolds. We demonstrate that a definably normal definable Cr manifold is a definably Cr diffeomorphic to a definable Cr submanifold. It enables us to show that the definable quotient of a definably compact definable Cr group by a definable subgroup exists.