Stably dualizable groups

Abstract

We extend the duality theory for topological groups from the classical theory for compact Lie groups, via the topological study by J. R. Klein [Kl01] and the p-complete study for p-compact groups by T. Bauer [Ba04], to a general duality theory for stably dualizable groups in the E-local stable homotopy category, for any spectrum E. The principal new examples occur in the K(n)-local category, where the Eilenberg-Mac Lane spaces G = K(Z/p, q) are stably dualizable and nontrivial for 0 <= q <= n. We show how to associate to each E-locally stably dualizable group G a stably defined representation sphere SadG, called the dualizing spectrum, which is dualizable and invertible in the E-local category. Each stably dualizable group is Atiyah-Poincare self-dual in the E-local category, up to a shift by SadG. There are dimension-shifting norm- and transfer maps for spectra with G-action, again with a shift given by SadG. The stably dualizable group G also admits a kind of framed bordism class [G] in pi*(LE S), in degree dimE(G) = [SadG] of the PicE-graded homotopy groups of the E-localized sphere spectrum.

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