Smooth approximations and their applications to homotopy types

Abstract

Let M, N the be smooth manifolds, Cr(M,N) the space of Cr maps endowed with weak Cr Whitney topology, and B ⊂ Cr(M,N) an open subset. It is proved that for 0≤ r<s≤∞ the inclusion B Cs(M,N) ⊂ B is a weak homotopy equivalence. It is also established a parametrized variant of such a result. In particular, it is shown that for a compact manifold M, the inclusion of the space of Cs isotopies [0,1]× M M fixed near \0,1\× M into the space of loops (Dr(M), idM) of the group of Cr diffeomorphisms of M at idM is a weak homotopy equivalence.