Homology operations for gravity algebras
Abstract
Let M0,n+1 be the moduli space of genus zero Riemann surfaces with n+1 marked points. In this paper we compute H*n(M0,n+1;Fp) and H*n(M0,n+1;Fp( 1)) for any n∈N and any prime p, where Fp( 1) denotes the sign representation of the symmetric group n. The interest in these homology groups is twofold: on the one hand classes in these equivariant homology groups parametrize homology operations for gravity algebras. On the other hand the homotopy quotient (M0,n+1)_n is a model for the classifying space for Bn/Z(Bn), the quotient of the braid group Bn by its center.
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