Betti splittings for powers of sums of ideals

Abstract

Let A and B be standard graded polynomial rings over a field k and I and J be non-zero, proper homogeneous ideals contained in A and B, respectively. Denote by P the sum of I and J in R=Ak B. Under reasonable conditions on k, I and J, we provide exact formulas and describe the asymptotic behavior of the depth and the regularity of the powers of P in terms of the data of I and J. Thereby, we strengthen previous work of H.T. H\`a, N.V. Trung and T.N. Trung. Our main technical result says that, under the aforementioned conditions, for all s 0 and all n 1, the simple decomposition IsPn=Is+1Pn-1+IsJn yields a Betti splitting for IsPn. A decomposition of an ideal L as a sum of two subideals is called a Betti splitting if the minimal free resolution of L is completely determined by those of the summands and their intersection.