Nilpotence and Duality in the Complete Cohomology of a Module
Abstract
Suppose that G is a finite group and k is a field of characteristic p>0. We consider the complete cohomology ring EM* = Σn ∈ Z ExtnkG(M,M). We show that the ring has two distinguished ideals I* ⊂eq J* ⊂eq EM* such that I* is bounded above in degrees, EM*/J* is bounded below in degree and J*/I* is eventually periodic with terms of bounded dimension. We prove that if M is neither projective nor periodic, then the subring of all elements in negative degrees in EM* is a nilpotent algebra.
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