MORITA DUALITY AND RING EXTENSIONS

In this paper, we show that there exists a category equivalence between certain categories of A-rings (respectively, ring extensions of A) and B-rings (respectively, ring extensions of B), where A and B are Morita dual rings. In this category equivalence, corresponding two A-ring and B-ring are Morita dual. This is an improvement of a result of Muller, which state that if a ring A has a Morita duality induced by a bimodule BQA and R is a ring extension of A such that RA and HomA(R, Q)A are linearly compact, then R has a Morita duality induced by the bimodule SEndR(HomA(R, Q))R with S = EndR(HomA(R, Q)). We also investigate relationships between Morita duality and finite ring extensions. Particularly, we show that if A and B are Morita dual rings with B basic, then every finite triangular (respectively, normalizing) extension R of A is Morita dual to a finite triangular (respectively, normalizing) extension S of B, and we give a result about finite centralizing free extensions, which unify a result of Mano about self-duality and a result of Fuller–Haack about semigroup rings.