Stable homotopy type of p-local finite groups via biset functors

Abstract: The Martino-Priddy conjecture (now a theorem) says that the p-fusion of G can be recovered (up to isomorphism) from the unstable homotopy type of BG^p. By making strong use of the Segal conjecture, the same authors approached a stable analogous of that result. In this talk, we will explore some consequences of the (so-called) stable Martino-Priddy conjecture and their generalizations for p-local finite groups.

algebraic topologycategory theorygroup theoryK-theory and homology

Audience: researchers in the topic

Bilkent Topology Seminar

Series comments: Contact the organizer to get access to Zoom.

Recordings of talks available at www.youtube.com/channel/UCLrmyGpqxyeVpTcA1b5HcMw/videos