The loop homology algebra of spheres and projective spaces
Abstract
Chas and Sullivan recently defined an intersection product on the homology H*(LM) of the space of smooth loops in a closed, oriented manifold M. In this paper we will use the homotopy theoretic realization of this product described by the first two authors to construct a second quadrant spectral sequence of algebras converging to the loop homology multiplicatively, when M is simply connected. The E2 term of this spectral sequence is H*(M;H*( M)) where the product is given by the cup product on the cohomology of the manifold H* (M) with coefficients in the Pontryagin ring structure on the homology of its based loop space H*( M). We then use this spectral sequence to compute the ring structures of H* (LSn) and H* (Ln).
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