Abstract
We study string topology for classifying spaces of connected compact Lie groups, drawing connections with Hochschild cohomology and equivariant homotopy theory. First, for a compact Lie group G, we show that the string topology prospectrum LBG− TBG is equivalent to the homotopy fixed-point prospectrum for the conjugation action of G on itself, S0[G]hG. Dually, we identify LBG-ad with the homotopy orbit spectrum (DG)hG, and study ring and co-ring structures on these spectra. Finally, we show that in homology, these products may be identified with the Gerstenhaber cup product in the Hochschild cohomology of C*(BG) and C*(G), respectively. These, in turn, are isomorphic via Koszul duality.
| Original language | English (US) |
|---|---|
| Pages (from-to) | 837-856 |
| Number of pages | 20 |
| Journal | Journal of Topology |
| Volume | 1 |
| Issue number | 4 |
| DOIs | |
| State | Published - Oct 2008 |
| Externally published | Yes |
Bibliographical note
Funding Information:This material is based upon work partially supported by the National Science Foundation under agreement no. DMS‐0705428.
Publisher Copyright:
© 2008 London Mathematical Society.