La Grassmannienne non-lin\'eaire comme vari\'et\'e fr\'ech\'etique homog\`ene

Abstract

Let (M,g) be a compact Riemannian manifold of dimension n. For k ∈ 0,...,n, we denote Grk(M) the set of compact, connected and oriented submanifolds of M of dimension k. This set is called the non-linear Grassmannian. In this article, we endow Grk(M) with a smooth Fr\'echet manifold structure and investigate its basic geometrical properties. In particular, if ∈ Grk(M), we show that the space of smooth embeddings Emb(,M) is the total space of principal fiber bundle with base space a collection of connected components of Grk(M). We also show that the connected components of Grk(M) are homogeneous with respect to the natural action of the group of diffeomorphisms of M.