Abstract
AbstractSuppose that G is a finite group and k is a field of characteristic . Let be the thick tensor ideal of finitely generated modules, whose support variety is in a fixed subvariety V of the projectivized prime ideal spectrum . Let denote the Verdier localization of the stable module category at . We show that if V is a finite collection of closed points and if the p‐rank of every maximal elementary abelian p‐subgroups of G is at least 3, then the endomorphism ring of the trivial module in is a local ring, whose unique maximal ideal is infinitely generated and nilpotent. In addition, we show an example where the endomorphism ring in of a compact object is not finitely presented as a module over the endomorphism ring of the trivial module.
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