The small finitistic dimensions of commutative rings

Abstract

Let R be a commutative ring with identity. The small finitistic dimension (R) of R is defined to be the supremum of projective dimensions of R-modules with finite projective resolutions. In this paper, we characterize a ring R with (R)≤ n using finitely generated semi-regular ideals, tilting modules, cotilting modules of cofinite type or vaguely associated prime ideals. As an application, we obtain that if R is a Noetherian ring, then (R)= \(,R)|∈ (R)\ where (,R) is the grade of on R . We also show that a ring R satisfies (R)≤ 1 if and only if R is a ring. As applications, we show that the small finitistic dimensions of strong \ rings and are at most one. Moreover, for any given n∈ N, we obtain examples of total rings of quotients R with (R)=n.