Cpn-equivariant Mahowald invariants
Abstract
We introduce the Cpn-Mahowald invariant: a relation π SCpn-1 π S between the equivariant and classical stable stems which reduces to the classical Mahowald invariant when n=1. We compute the Cpn-Mahowald invariants of all elements in the Burnside ring A(Cpn-1) = π0 SCpn-1, extending Mahowald and Ravenel's computation of MCp(pk). As a consequence, we determine the image of the Cp-geometric fixed point map Cp : πV SCpn π0 SCpn/Cp A(Cpn-1) when V is fixed point free, extending classical theorems of Bredon, Landweber, and Iriye for n=1.
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