Abstract
Given positive integers \(n_1,\ldots ,n_p\), we say that a submonoid M of \(({\mathbb N},+)\) is a \((n_1,\ldots ,n_p)\)-bracelet if \(a+b+\left\{ n_1,\ldots ,n_p\right\} \subseteq M\) for every \(a,b\in M\backslash \left\{ 0\right\} \). In this note, we explicitly describe the smallest \(\left( n_1,\ldots ,n_p\right) \)-bracelet that contains a finite subset X of \({\mathbb N}\). We also present a recursive method that enables us to construct the whole set \(\mathcal B(n_1,\ldots ,n_p)=\left\{ M|M \quad \text {is a} \quad (n_1,\ldots ,n_p)\text {-bracelet}\right\} \). Finally, we study \((n_1,\ldots ,n_p)\)-bracelets that cannot be expressed as the intersection of \((n_1,\ldots , n_p)\)-bracelets properly containing it.
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The authors would like to thank the anonymous referees for their accurate reading and their suggestions.
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J. C. Rosales was partially supported by the research groups FQM-343 FQM-5849 (Junta de Andalucía/Feder) and project MTM2010-15595(MICINN, Spain). M. B. Branco is supported by Universidade de Évora and CIMA-UE 2013.
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Rosales, J.C., Branco, M.B. & Torrão, D. Bracelet monoids and numerical semigroups. AAECC 27, 169–183 (2016). https://doi.org/10.1007/s00200-015-0274-3
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DOI: https://doi.org/10.1007/s00200-015-0274-3