Symbolic powers of sums of ideals

Abstract

Let I and J be nonzero ideals in two Noetherian algebras A and B over a field k. Let I+J denote the ideal generated by I and J in Ak B. We prove the following expansion for the symbolic powers: (I+J)(n) = Σi+j = n I(i) J(j). If A and B are polynomial rings and if chara(k) = 0 or if I and J are monomial ideals, we give exact formulas for the depth and the Castelnuovo-Mumford regularity of (I+J)(n), which depend on the interplay between the symbolic powers of I and J. The proof involves a result of independent interest which states that under the above assumption, the induced map ToriA(k,I(n)) ToriA(k,I(n-1)) is zero for all i 0, n 0. We also investigate other properties and invariants of (I+J)(n) such as the equality between ordinary and symbolic powers, the Waldschmidt constant and the Cohen-Macaulayness.