n-complete algebras and McKay quivers
Abstract
Let n be the cone of an (n-1)-complete algebra over an algebraically closed field k. In this paper, we prove that if the bound quiver (Qn,n) of n is a truncation from the bound McKay quiver (QG,G) of a finite subgroup G of GL(n,k), the bound quiver (Qn+1, n+1) of n+1, the cone of n, is a truncation from the bound McKay quiver (QG,G) of G, where G G× Zm for some m∈ N.
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