The Frobenius problem for numerical semigroups generated by sequences that satisfy a linear recurrence relation
Number Theory
2023-01-25 v2
Abstract
Consider a sequence of positive integers of the form , , where and are positive integers, . For each , let be the submonoid of generated by , with . We obtain a numerical semigroup by dividing every element of by . We characterize the embedding dimension of and describe a method to find the minimal generating set of . We also show how to find the maximum element of the Ap\'ery set , characterize the elements of , and use these results to compute the Frobenius number of the numerical semigroup , where .
Cite
@article{arxiv.2111.04899,
title = {The Frobenius problem for numerical semigroups generated by sequences that satisfy a linear recurrence relation},
author = {Fabián Arias and Jerson Borja},
journal= {arXiv preprint arXiv:2111.04899},
year = {2023}
}
Comments
30 pages