Integral closures of powers of sums of ideals

Abstract

Let k be a field, let A and B be polynomial rings over k, and let S= A k B. Let I ⊂eq A and J ⊂eq B be monomial ideals. We establish a binomial expansion for rational powers of I+J ⊂eq S in terms of those of I and J. Particularly, for a positive rational number u, we prove that (I+J)u = Σ0 ω u, \ ω ∈ Q Iω Ju-ω, and that the sum on the right hand side is a finite sum. This finite sum can be made more precise using jumping numbers of rational powers of I and J. We further give sufficient conditions for this formula to hold for the integral closures of powers of I+J in terms of those of I and J. Under these conditions, we provide explicit formulas for the depth and regularity of (I+J)k in terms of those of powers of I and J.

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