Download this article
 Download this article For screen
For printing
Recent Issues

Volume 16
Issue 4, 547–726
Issue 3, 365–546
Issue 2, 183–364
Issue 1, 1–182

Volume 15, 5 issues

Volume 14, 5 issues

Volume 13, 5 issues

Volume 12, 8 issues

Volume 11, 5 issues

Volume 10, 5 issues

Volume 9, 5 issues

Volume 8, 5 issues

Volume 7, 6 issues

Volume 6, 4 issues

Volume 5, 4 issues

Volume 4, 4 issues

Volume 3, 4 issues

Volume 2, 5 issues

Volume 1, 2 issues

The Journal
About the Journal
Editorial Board
Editors’ Interests
Submission Guidelines
Submission Form
Policies for Authors
Ethics Statement
ISSN: 1944-4184 (e-only)
ISSN: 1944-4176 (print)
Author Index
Coming Soon
Other MSP Journals
This article is available for purchase or by subscription. See below.
A generalization of a theorem about gapsets with depth at most 3

Matheus Bernardini and Patrick Melo

Vol. 16 (2023), No. 2, 313–319

We provide a generalization of a theorem proved by Eliahou and Fromentin which exhibits a remarkable property of the sequence (ng), where ng denotes the number of gapsets with genus g and depth at most 3.

PDF Access Denied

We have not been able to recognize your IP address as that of a subscriber to this journal.
Online access to the content of recent issues is by subscription, or purchase of single articles.

Please contact your institution's librarian suggesting a subscription, for example by using our journal-recom­mendation form. Or, visit our subscription page for instructions on purchasing a subscription.

You may also contact us at
or by using our contact form.

Or, you may purchase this single article for USD 30.00:

numerical semigroup, gapset, Kunz coordinates, depth, level
Mathematical Subject Classification
Primary: 20M14, 05A15
Secondary: 05A19
Received: 18 February 2022
Revised: 7 April 2022
Accepted: 18 May 2022
Published: 26 May 2023

Communicated by Nathan Kaplan
Matheus Bernardini
Faculdade do Gama
Universidade de Brasília
Patrick Melo
Faculdade do Gama
Universidade de Brasília