Multiplier Modules of extended Rees algebras
Abstract
Given a local ring (R, m) and an ideal a of positive height, we give a way of computing multiplier module J(ωT, t-λ) for the extended Rees algebra T =R[a t, t-1] for an ideal a by proving a decomposition theorem for J(ωT, t-λ), (also see the works of Budur, Mustata and Saito). We compute the multiplier module J(ωS, (a · S)λ) for the Rees algebra S =R[a t] as well (also see the works of Hyry and Kotal-Kummini). We use these decompositions to understand relationships between associated graded rings, Rees and extended Rees algebras having rational singularities (also see the works of Hara, Watanabe, and Yoshida).
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