Characterization Of Left Artinian Algebras Through Pseudo Path Algebras

Abstract

In this paper, using pseudo path algebras, we generalize Gabriel's Theorem on elementary algebras to left Artinian algebras over a field k when it is splitting over its radical, in particular, when the dimension of the quotient algebra decided by the n'th Hochschild cohomology is less than 2 (for example, k is finite or chark=0). Using generalized path algebras, the generalized Gabriel's Theorem is given for finite dimensional algebras with 2-nilpotent radicals which is splitting over its radical. As a tool, the so-called pseudo path algebras are introduced as a new generalization of path algebras, which can cover generalized path algebras (see Fact 2.5). The main result is that (i) for a left Artinian k-algebra A and r=r(A) the radical of A, when the quotient algebra A/r can be lifted, it holds that A PSEk(,A,) with Js⊂<>⊂ J for some s (Theorem 3.2); (ii) for a finite dimensional k-algebra A with r=r(A) 2-nilpotent radical, when the quotient algebra A/r can be lifted, it holds that A k(,A,) with J2⊂<>⊂ J2+ J Ker (Theorem 4.3), where is the quiver of A and is a set of relations. Meantime, the uniqueness of the quivers and generalized path algebra/pseudo path algebras satisfying the isomorphism relations is obtained in the case when the ideals generated by the relations are admissible (see Theorem 3.5 and 4.4).