Formality of function spaces

Abstract

Let X be a nilpotent space such that there exists p≥ 1 with Hp(X, Q) 0 and Hn(X, Q)=0 if n>p. Let Y be a m-connected space with m≥ p+1 and H*(Y, Q) is finitely generated as algebra. We assume that X is formal and there exists p odd such that Hp(X, Q) 0. We prove that if the space F(X,Y) of continuous maps from X to Y is formal, then Y has the rational homotopy type of a product of Eilenberg Mac Lane spaces. At the opposite, we exhibit an example of a formal space F(S2,Y) where Y is not rationally equivalent to a product of Eilenberg Mac Lane spaces.