English

On semigroup algebras with rational exponents

Commutative Algebra 2021-05-03 v4

Abstract

In this paper, a semigroup algebra consisting of polynomial expressions with coefficients in a field FF and exponents in an additive submonoid MM of Q0\mathbb{Q}_{\ge 0} is called a Puiseux algebra and denoted by F[M]F[M]. Here we study the atomic structure of Puiseux algebras. To begin with, we answer the Isomorphism Problem for the class of Puiseux algebras, that is, we show that for a field FF if two Puiseux algebras F[M1]F[M_1] and F[M2]F[M_2] are isomorphic, then the monoids M1M_1 and M2M_2 must be isomorphic. Then we construct three classes of Puiseux algebras satisfying the following well-known atomic properties: the ACCP property, the bounded factorization property, and the finite factorization property. We show that there are bounded factorization Puiseux algebras with extremal systems of sets of lengths, which allows us to prove that Puiseux algebras cannot be determined up to isomorphism by their arithmetic of lengths. Finally, we give a full description of the seminormal closure, root closure, and complete integral closure of a Puiseux algebra, and use such description to provide a class of antimatter Puiseux algebras (i.e., Puiseux algebras containing no irreducibles).

Keywords

Cite

@article{arxiv.1801.06779,
  title  = {On semigroup algebras with rational exponents},
  author = {Felix Gotti},
  journal= {arXiv preprint arXiv:1801.06779},
  year   = {2021}
}

Comments

20 pages; to appear in Communications in Algebra

R2 v1 2026-06-22T23:51:01.324Z