On cyclic fixed points of spectra

Abstract

For a finite p-group G and a bounded below G-spectrum X of finite type mod p, the G-equivariant Segal conjecture for X asserts that the canonical map XG --> XhG is a p-adic equivalence. Let Cpn be the cyclic group of order pn. We show that if the Cp Segal conjecture holds for a Cpn spectrum X, as well as for each of its Cpe geometric fixed points for 0 < e < n, then then Cpn Segal conjecture holds for X. Similar results hold for weaker forms of the Segal conjecture, asking only that the canonical map induces an equivalence in sufficiently high degrees, on homotopy groups with suitable finite coefficients.