Ding modules and dimensions over formal triangular matrix rings

Abstract

Let T=(matrix A&0\\ U&B matrix) be a formal triangular matrix ring, where A and B are rings and U is a (B, A)-bimodule. We prove that: (1) If UA and B U have finite flat dimensions, then a left T-module (matrix M1\\ M2matrix)M is Ding projective if and only if M1 and M2/ im(M) are Ding projective and the morphism M is a monomorphism. (2) If T is a right coherent ring, BU has finite flat dimension, UA is finitely presented and has finite projective or FP-injective dimension, then a right T-module (W1, W2)_W is Ding injective if and only if W1 and (W) are Ding injective and the morphism W is an epimorphism. As a consequence, we describe Ding projective and Ding injective dimensions of a T-module.