Tensor-Multinomial Sums of Ideals: Primary Decompositions and Persistence of Associated Primes

Abstract

Given a polynomial ring C over a field and proper ideals I and J whose generating sets involve disjoint variables, we determine how to embed the associated primes of each power of I+J into a collection of primes described in terms of the associated primes of select powers of I and of J. We record two applications. First, in case the field is algebraically closed, we construct primary decompositions for powers of I+J from primary decompositions for powers of I and J. Separately, we attack the persistence problem for associated primes of powers of an ideal in case one of I or J is a non-zero normal ideal.