Smooth simplicial sets and universal Chern-Weil for infinite dimensional groups
Abstract
We give the construction of the universal, natural up to homotopy Chern-Weil differential graded algebra homomorphism: cw: I (G) (BG, R) for infinite dimensional Milnor regular Lie groups G, where (BG, R) is a certain de Rham algebra of BG (Milnor BG up to a natural weak homotopy equivalence) and where I (G) is the algebra of continuous, Ad G invariant, symmetric multilinear functionals on the Lie algebra. In particular, this applies to the group of compactly generated Hamiltonian symplectomorphisms, using which we verify a conjecture of Reznikov. For the construction of cw we introduce a basic geometric-categorical notion of a smooth simplicial set. Loosely, this is to Chen spaces as simplicial sets are to spaces. We then give a new construction of the classifying space of G as a smooth Kan complex, with the geometric realization weakly equivalent to the Milnor BG.
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