Finite-dimensional algebras with smallest resolutions of simple modules

Abstract

Let X be a finitely generated left module over a left artinian ring R, and let p(X)=\li\ be the infinite sequence of nonnegative integers where li is the length of the i-th term of the minimal projective resolution of X. We introduce a preorder relation on the set \p(X)\ and characterize the elementary finite-dimensional algebras with the following property. Let S be a simple -module, and let T be a finitely generated module over an arbitrary left artinian ring R. If the projective dimension of S does not exceed the projective dimension of T, then p(S) p(T). We characterize the indicated algebras by quivers with relations.

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