The Galois Alperin weight conjecture for finite category algebras

Abstract

Let p be a prime, k an algebraic closure of Fp and the Galois group Gal(k/Fp). Let C be a finite category and OC the p-orbit category of C defined by Linckelmann. We formulate a version of the Galois Alperin weight conjecture (GAWC) for finite category algebras stating that there exists a × Aut(C)-equivariant bijection between the set of isomorphism classes of simple kC-modules and that of the weights of kOC. We reduce the GAWC for finite categories to finite groups. For C an EI-category, we give a partition of weights of kOC with respect to blocks of kC and then formulate a blockwise Galois Alperin weight conjecture (BGAWC) for C. Similarly, we reduce the BGAWC for finite EI-categories to finite groups.