Remarks on the geometry and the topology of the loop spaces Hs(S1, N), for s≤ 1/2.

Abstract

We first show that, for a fixed locally compact manifold N, the space L2(S1,N) has not the homotopy type odf the classical loop space C∞(S1,N), by two theorems: - the inclusion C∞(S1,N) ⊂ L2(S1,N) is null homotopic if N is connected, - the space L2(S1,N) is contractible if N is compact and connected. After this first remark, we show that the spaces Hs(S1,N) carry a natural structure of Fr\"olicher space, equipped with a Riemannian metric, which motivates the definition of Riemannian Fr\"olicher space.