Remarks on Auslander's depth formula for quasi-projective dimension

Abstract

For nonzero finitely generated R-modules M and N over a Noetherian local ring R, Auslander's depth formula is the equality depth M + depth N = depth R + depth(TorqR(M,N)) - q, where q := \ i 0 ToriR(M,N) ≠ 0 \. Gheibi, Jorgensen, and Takahashi introduced a homological invariant called quasi-projective dimension, which generalizes projective dimension, and proved that Auslander's depth formula holds when M has finite quasi-projective dimension and q=0. In this paper, we prove that the formula still holds when M has finite quasi-projective dimension, q<∞ and depth(TorqR(M,N)) ≤ 1. We present several applications of this result; in particular, we recover a theorem of Araya and Yoshino, extend our result to the setting of semidualizing modules, and in this framework derive an improved version of the dependency formula for quasi-projective dimension with respect to a semidualizing module recently obtained by Dey, Ferraro, and Gheibi.