Finite homological dimension of Hom, vanishing of Ext, and applications to divisor class group

Abstract

For finitely generated modules M and N over a commutative Noetherian local ring R, we give various sufficient criteria for detecting freeness of M or N via vanishing of some finitely many Ext modules ExtiR(M,N) and finiteness of certain homological dimension of HomR(M,N). Some of our results provide partial progress towards answering a question of Ghosh-Takahashi and also generalize their main results in many ways, for instance, by reducing the number of vanishing. Certain special cases of our results allow us to address the Auslander-Reiten conjecture for modules whose (self-) dual has finite projective dimension. Along the way, we establish a new characterization of I-Ulrich modules of Dao-Maitra-Sridhar which we then apply to provide a negative answer to a question of Gheibi-Takahashi concerning characteristic modules. Among other techniques, we introduce and study certain generalizations of the notion of residually faithful modules of Brennan-Vasconcelos and Goto-Kumashiro-Loan, which play a crucial role in our study. As some applications of our results, we provide affirmative answers to two questions raised by Tony Se on n-semidualizing modules. Namely, we show that over a local ring of depth t, every (t-1)-semidualizing module of finite G-dimension is free. Moreover, we establish that for normal domains which satisfy Serre's condition (S3) and are locally Gorenstein in codimension two, the class of 1-semidualizing modules forms a subgroup of the divisor class group. These two groups coincide when, in addition, the ring is locally regular in codimension two.