Arithmetic of additively reduced monoid semidomains

Abstract: A subset S of an integral domain R is called a semidomain if the pairs (S, +) and (S, •) are semigroups with identities; additionally, we say that S is additively reduced provided that S contains no additive inverses. Given an additively reduced semidomain S and a torsion-free monoid M , we denote by S[M ] the semidomain consisting of polynomial expressions with coefficients in S and exponents in M ; we refer to these objects as additively reduced monoid semidomains. We study the factorization properties of ad… Show more