Prime ideals in infinite products of commutative rings

Abstract

We describe the prime ideals and, in particular, the maximal ideals in products R = Π Dλ of families (Dλ)λ ∈ of commutative rings. We show that every maximal ideal is induced by an ultrafilter on the Boolean algebra Π P((Dλ)), where (Dλ) is the spectrum of maximal ideals of Dλ, and P denotes the power set. If every Dλ is in a certain class of rings including finite character domains and one-dimensional domains, we completely characterize the maximal ideals of R. If every Dλ is a Pr\"ufer domain, we completely characterize all prime ideals of R.