On Integral Domains with Prime Divisor Finite Property
Abstract
An integral domain D is called a prime-divisor-finite domain (PDF-domain) if every nonzero element has only finitely many nonassociate prime divisors. A domain D is said to be a tightly prime-divisor-finite domain (TPDF-domain) if it is a PDF-domain and every nonzero nonunit element admits at least one prime divisor. In this paper, we study TPDF-domains. We investigate some basic properties of these domains and examine the behavior of the TPDF property under standard constructions such as localization, D+M constructions, and polynomial rings.
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