Local Cohomology of Bigraded Rees Algebras and Normal Hilbert Coefficients

Abstract

Let (R,) be an analytically unramified Cohen-Macaulay local ring of dimension 2 with infinite residue field and I be the integral closure of an ideal I in R. Necessary and sufficient conditions are given for Ir+1Js+1=aIrJs+1+bIr+1Js to hold for allr ≥ r0ands ≥ s0 in terms of vanishing of [H2(at1,bt2)(R(I,J))](r0,s0), where a ∈ I,b ∈ J is a good joint reduction of the filtration \IrJs\. This is used to derive a theorem due to Rees on normal joint reduction number zero. The vanishing of e2(IJ) is shown to be equivalent to Cohen-Macaulayness of R(I,J).