On tilting complexes over blocks covering cyclic blocks

Abstract

Let p be a prime number, k an algebraically closed field of characteristic p, G a finite group, and G a normal subgroup of G having a p-power index in G. Moreover let B be a block of kG with a cyclic defect group and B be the unique block of kG covering B. We study tilting complexes over the block B and show that the block B is a tilting-discrete algebra. Moreover we show that the set of all tilting complexes over B is isomorphic to that over B as partially ordered sets.

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