Non-separable Hilbert manifolds of continuous mappings

Abstract

Let X, Y be separable metrizable spaces, where X is noncompact and Y is equipped with an admissible complete metric d. We show that the space C(X,Y) of continuous maps from X into Y equipped with the uniform topology is locally homeomorphic to the Hilbert space of weight 20 if (1) (Y, d) is an ANRU, a uniform version of ANR and (2) the diameters of components of Y is bounded away from zero. The same conclusion holds for the subspace CB(X,Y) of bounded maps if Y is a connected complete Riemannian manifold.

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