On isomorphisms of generalized multifold extensions of algebras without nonzero oriented cycles

Abstract

Assume that a basic algebra A over an algebraically closed field with a basic set A0 of primitive idempotents has the property that eAe= for all e ∈ A0. Let n be a nonzero integer, and φ and two automorphisms of the repetitive category A of A with jump n (namely, they send A[0] to A[n], where A[i] is the i-th copy of A in A for all i ∈ Z). If φ and coincide on the objects and if there exists a map A0 such that 0(y)φ0(a)=0(a) 0(x) for all morphisms a∈ A(x,y), then the orbit categories A/ φ and A/ are isomorphic as Z-graded categories.