Topological symmetric and braid homologies

Abstract

We identify topological symmetric homology as the free E∞-algebra on an E1-algebra and topological braid homology as the free E2-algebra on an E1-algebra. In this way, topological symmetric homology and topological braid homology can be regarded as variants of 1-dimensional representation homology. In order to identify topological braid homology as the free E2-algebra on an E1-algebra, we prove that the E2-monoidal envelope of the associative operad can be identified with the braided crossed simplicial group. Using this, we also compute the topological braid homology of grouplike E1-spaces. Further, we develop computational tools for topological symmetric and braid homologies. These tools allow us to perform low-degree computations of topological symmetric homology and prove that it is not Morita invariant. We also compute the topological ΔG-homology of Thom spectra in general and produce explicit formulas in the case of topological symmetric and braid homologies.