The Auslander-Type Condition of Triangular Matrix Rings
Abstract
Let R be a left and right Noetherian ring and n,k any non-negative integers. R is said to satisfy the Auslander-type condition Gn(k) if the right flat dimension of the (i+1)-st term in a minimal injective resolution of RR is at most i+k for any 0 ≤ i ≤ n-1. In this paper, we prove that R is Gn(k) if and only if so is a lower triangular matrix ring of any degree t over R.
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