Factorizations in rational monogenic semidomains
Abstract
For α∈ C, the monogenic semidomain generated by α is the smallest subsemiring Sα of the complex field C containing α. We initiate a systematic study of the arithmetic and factorizations of the monogenic semidomains Sq generated by rational parameters q. After some preliminaries, we introduce and investigate the monoid of technical fractions Tq, which is a divisor-closed submonoid of the multiplicative monoid of Sq that encodes a significant amount of arithmetic information about Sq. We then study several fundamental factorization properties of Sq: the bounded factorization (BF) and finite factorization (FF) properties, the unique factorization (UF) property, and the half-factorial (HF) property. First, we prove that Sq satisfies the UF property if and only if it satisfies the HF property, which happens when q ∈ N N-1. We determine all the positive rational values of the parameter q for which Sq satisfies the FF property. Then we show that, over the class of rational monogenic semidomains, the BF property is equivalent to the ascending chain condition on principal ideals. Finally, we prove that Sq is a Krull semidomain if and only if it is root-closed, which happens precisely when Sq satisfies the UF property.
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