Projective monomial curves associated to numerical semigroups with multiplicity e, width e-1, and embedding dimension e-2

Abstract

Numerical semigroups with multiplicity e, width e-1, and embedding dimension e-2 are of the form S(e,m,n) = \e, e+1, …, 2e-1\ \e+m, e+n\ , for some 1 ≤ m < n ≤ e-2. Inspired by the work of Sally, Herzog and Stamate studied the special case S(e,2,3), which they called the ``Sally numerical semigroups''. Recently, Dubey et. al. computed a minimal generating set of the defining ideal of the numerical semigroups S(e,m,n) for m ≥ 2. In this article, we first obtain an analog for the numerical semigroups S(e,1,n), and then shift our focus to the projective monomial curves in Pe-2 defined by the semigroups S(e,m,n). We obtain a Gr\"obner basis for the defining ideal of the projective monomial curves associated to the semigroups S(e,m,n). Moreover, we provide characterizations of Cohen--Macaulay and Gorenstein properties of these curves. Specifically, we prove that these are Cohen--Macaulay if and only if (m,n) ≠ (e-4,e-3), and Gorenstein if and only if (e,m,n)∈ \ (4,1,2), (5,2,3)\. Furthermore, when these curves are Cohen--Macaulay, we compute the Castelnuovo--Mumford regularity of their coordinate ring.

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