@misc{10481/92145,
year = {2024},
month = {3},
url = {https://hdl.handle.net/10481/92145},
abstract = {In this work, we will introduce the concept of ratio-covariety, as a family R of numerical
semigroups that has a minimum, denoted by min(R), is closed under intersection, and if S ∈ R
and S ̸= min(R), then S\{r(S)} ∈ R, where r(S) denotes the ratio of S. The notion of ratiocovariety
will allow us to: (1) describe an algorithmic procedure to compute R; (2) prove the
existence of the smallest element of R that contains a set of positive integers; and (3) talk about
the smallest ratio-covariety that contains a finite set of numerical semigroups. In addition, in
this paper we will apply the previous results to the study of the ratio-covariety R(F,m) = {S |
S is a numerical semigroup with Frobenius number F and multiplicity m}.},
publisher = {MDPI},
keywords = {Numerical semigroup},
keywords = {Frobenius number},
keywords = {Genus},
title = {Ratio-Covarieties of Numerical Semigroups},
doi = {10.3390/axioms13030193},
author = {Moreno Frías, María Ángeles and Rosales González, José Carlos},
}