Rational homotopy type of the space of immersions of a manifold in an euclidian space

Abstract

Let M be a simply-connected m dimensional manifold of finite type and k a positif integer. In this paper we show that the rational Betti numbers of each component of the space of immersions of M in Rm+k, have polynomial growth. As consequence, we deduce that, if M is a manifold with Euler characteristic (M)≤ -2, the Betti numbers of smooth embeddings, Emb(M ,Rm+k), have exponential growth if k≥ m+1. The main tool of this work is the construction of an explicit model of the space of immersions.