Valuation Ideal Factorization Domains

Abstract

An integral domain D is a valuation ideal factorization domain (VIFD) if each nonzero principal ideal of D can be written as a finite product of valuation ideals. Clearly, π-domains are VIFDs. We study the ring-theoretic properties of VIFDs and the *-operation analogs of VIFDs. Among them, we show that if D is treed (resp., *-treed), then D is a VIFD (resp., *-VIFD) if and only if D is an h-local Pr\"ufer domain (resp., a *- h-local P*MD) if and only if every nonzero prime ideal of D contains an invertible (resp., a *-invertible) valuation ideal. We also study integral domains D such that for each nonzero nonunit a∈ D, there is a positive integer n such that an can be written as a finite product of valuation elements.

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