Smooth approximations in PL geometry

Abstract

Let Y⊂ Rn be a triangulable set and let r be either a positive integer or r=∞. We say that Y is a Cr-approximation target space, or a Cr-ats for short, if it has the following universal approximation property: For each m∈ N and each locally compact subset X of~ Rm, any continuous map f:X Y can be approximated by Cr maps g:X Y with respect to the strong C0 Whitney topology. Taking advantage of new approximation techniques we prove: if Y is weakly Cr triangulable, then Y is a Cr-ats. This result applies to relevant classes of triangulable sets, namely: (1) every locally compact polyhedron is a C∞-ats, (2) every set that is locally Cr equivalent to a polyhedron is a Cr-ats, and (3) every locally compact locally definable set of an arbitrary o-minimal structure is a C1-ats (this includes locally compact locally semialgebraic sets and locally compact subanalytic sets). In addition, we prove: if Y is a global analytic set, then each proper continuous map f:X Y can be approximated by proper C∞ maps g:X Y. Explicit examples show the sharpness of our results.