The Lubin-Tate Theory of Configuration Spaces: I

Abstract

We construct a spectral sequence converging to the Morava E-theory of unordered configuration spaces and identify its E2-page as the homology of a Chevalley-Eilenberg-like complex for Hecke Lie algebras. Based on this, we compute the E-theory of the weight p summands of iterated loop spaces of spheres (parametrising the weight p operations on En-algebras), as well as the E-theory of the configuration spaces of p points on a punctured surface. We read off the corresponding Morava K-theory groups, which appear in a conjecture by Ravenel. Finally, we compute the Fp-homology of the space of unordered configurations of p particles on a punctured surface.