Change-of-Rings Theorems for the Small Finitistic Dimension

Abstract

In this paper, we study the small finitistic dimension of a commutative ring from the viewpoint of finitistic flat homological algebra. Using the class FPR(R) of modules admitting finite projective resolutions, we investigate the finitistic flat (FT-flat) dimension and establish several of its basic properties. We prove change-of-rings results for the FT-flat dimension, including quotient and polynomial extension results, as well as localization inequalities. As applications, we obtain characterizations of the small finitistic dimension in terms of FT-flat dimension, derive quotient and polynomial extension theorems for the small finitistic dimension, and establish local upper bounds in terms of the small finitistic dimensions of localizations.