Arithmetic of semisubtractive semidomains
Abstract
A subset S of an integral domain is called a semidomain if the pairs (S,+) and (S\0\, ·) are commutative and cancellative semigroups with identities. The multiplication of S extends to the group of differences G(S), turning G(S) into an integral domain. In this paper, we study the arithmetic of semisubtractive semidomains (i.e., semidomains S for which either s ∈ S or -s ∈ S for every s ∈ G(S)). Specifically, we provide necessary and sufficient conditions for a semisubtractive semidomain to be atomic, to satisfy the ascending chain condition on principals ideals, to be a bounded factorization semidomain, and to be a finite factorization semidomain, which are subsequent relaxations of the property of having unique factorizations. In addition, we present a characterization of factorial and half-factorial semisubtractive semidomains. Throughout the article, we present examples to provide insight into the arithmetic aspects of semisubtractive semidomains.
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