Asymptotic behaviour of bigraded components of local cohomology modules

Abstract

Let C be a commutative Noetherian ring containing a field K of characteristic zero. Let R=C[X1, …, Xn, Y1, …, Ym] be a polynomial ring over C with bideg~ c=(0,0) for all c ∈ C, bideg~ Xi=(1,0) and bideg~ Yj=(0,1) for i=1, …, n and j=1, …, m. Let I be a bihomogeneous ideal in R. In this article, we study asymptotic behaviour of bigraded pieces of the local cohomology module HiI(R). Moreover, under the extra assumption that C is regular, we investigate the asymptotic stability of invariants associated to its bigraded components. Consequently, we obtain certain properties of components of the bigraded local cohomology module HiI(R), where C=K is a field and I is a binomial edge ideal.

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