Rational homotopy of the space of immersions between manifolds

Abstract

In this paper we study the rational homotopy of the space of immersions, Imm(M,N), of a manifold M of dimension m≥ 0 into a manifold N of dimension m+k, with k≥ 2. In the special case when N=Rm+k and k is odd we prove that each connected component of Imm(M,Rm+k) has the rational homotopy type of product of Eilenberg Mac Lane space. We give an explicit description of each connected component and prove that it only depends on m, k and the rational Betti numbers of M. For a more general manifold N, we prove that the path connected of Imm(M,N) has the rational homotopy type of some component of an explicit mapping space when some Pontryagin classes vanishes.