Effective generic freeness and applications to local cohomology

Abstract

Let A be a Noetherian domain and R be a finitely generated A-algebra. We study several features regarding the generic freeness over A of an R-module. For an ideal I ⊂ R, we show that the local cohomology modules HIi(R) are generically free over A under certain settings where R is a smooth A-algebra. By utilizing the theory of Gr\"obner bases over arbitrary Noetherian rings, we provide an effective method to make explicit the generic freeness over A of a finitely generated R-module.