On real analytic Banach manifolds

Abstract

Let X be a real Banach space with an unconditional basis (e.g., X=2 Hilbert space), ⊂ X open, M⊂ a closed split real analytic Banach submanifold of , E M a real analytic Banach vector bundle, and AE M the sheaf of germs of real analytic sections of E M. We show that the sheaf cohomology groups Hq(M, AE) vanish for all q1, and there is a real analytic retraction r:U M from an open set U with M⊂ U⊂ such that r(x)=x for all x∈ M. Some applications are also given, e.g., we show that any infinite dimensional real analytic Hilbert submanifold of separable affine or projective Hilbert space is real analytically parallelizable.