Stable splitting of mapping spaces via nonabelian Poincar\'e duality
Abstract
We use nonabelian Poincar\'e duality to recover the stable splitting of compactly supported mapping spaces, Mapc(M,nX), where M is a parallelizable n-manifold. Our method for deriving this splitting is new, and naturally extends to give a more general stable splitting of the space of compactly supported sections of a certain bundle on M with fibers nX, twisted by the tangent bundle of M. This generalization incorporates possible O(n)-actions on X as well as accommodating non-parallelizable manifolds.
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