A constructive counterpart of the subdirect representation theorem for reduced rings
Abstract
We give a constructive counterpart of the theorem of Andrunakievic and Rjabuhin, which states that every reduced ring is a subdirect product of domains. As an application, we extract a constructive proof of the fact that every ring A satisfying ∀ x∈ A. x3=x is commutative from a classical proof. We also prove a similar result for semiprime ideals.
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