Manifolds of Lie-Group-Valued Cocycles and Discrete Cohomology

Abstract

Consider a compact group G acting on a real or complex Banach Lie group U, by automorphisms in the relevant category, and leaving a central subgroup K U invariant. We define the spaces KZn(G,U) of K-relative continuous cocycles as those maps Gn U whose coboundary is a K-valued (n+1)-cocycle; this applies to possibly non-abelian U, in which case n=1. We show that the KZn(G,U) are analytic submanifolds of the spaces C(Gn,U) of continuous maps Gn U and that they decompose as disjoint unions of fiber bundles over manifolds of K-valued cocycles. Applications include: (a) the fact that Zn(G,U)⊂ C(Gn,U) is an analytic submanifold and its orbits under the adjoint of the group of U-valued (n-1)-cochains are open; (b) hence the cohomology spaces Hn(G,U) are discrete; (c) for unital C*-algebras A and B with A finite-dimensional the space of morphisms A B is an analytic manifold and nearby morphisms are conjugate under the unitary group U(B); (d) the same goes for A and B Banach, with A finite-dimensional and semisimple; (e) and for spaces of projective representations of compact groups in arbitrary C* algebras (the last recovering a result of Martin's).

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