Auslander-Reiten and Huneke-Wiegand conjectures over quasi-fiber product rings

Abstract

In this paper we explore consequences of the vanishing of Ext for finitely generated modules over a quasi-fiber product ring R; that is, R is a local ring such that R/( x) is a non-trivial fiber product ring, for some regular sequence x of R. Equivalently, the maximal ideal of R/( x) decomposes as a direct sum of two nonzero ideals. Gorenstein quasi-fiber product rings are AB-rings and are Ext-bounded. We show in Theorem 3.31 that quasi-fiber product rings satisfy a sharpened form of the Auslander-Reiten Conjecture. We also make some observations related to the Huneke-Wiegand conjecture for quasi-fiber product rings.

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