Generic Initial ideals of Singular Curves in Graded Lexicographic Order

TL;DR

This paper investigates the structure of generic initial ideals of singular projective curves in graded lexicographic order, providing a formula for their regularity based on degree, genus, and singularity conditions.

Contribution

It generalizes previous results from smooth to singular curves, offering a formula for the regularity of generic initial ideals in terms of geometric invariants.

Findings

Derived a formula for the regularity of generic initial ideals of singular curves.

Connected the regularity to the degree, genus, and singularity dimension of the curve.

Validated results with computational examples using Macaulay 2 and Singular.

Abstract

In this paper, we are interested in the generic initial ideals of \textit{singular} projective curves with respect to the graded lexicographic order. Let $C$ be a \textit{singular} irreducible projective curve of degree $d\geq 5$ with the arithmetic genus $\rho_a(C)$ in $\p^r$ where $r\ge 3$. If $M(I_C)$ is the regularity of the lexicographic generic initial ideal of $I_C$ in a polynomial ring $k[x_0,..., x_r]$ then we prove that $M(I_C)$ is $1+\binom{d-1}{2}-\rho_a(C)$ which is obtained from the monomial $$ x_{r-3} x_{r-1}\,^{\binom{d-1}{2}-\rho_a(C)}, $$ provided that $\dim\Tan_p(C)=2$ for every singular point $p \in C$. This number is equal to one plus the number of non-isomorphic points under a generic projection of $C$ into $\p^2$. %if $\deg(C)=3,4$ then $M(I_C)= \deg(C)$ by the direct computation. Our result generalizes the work of J. Ahn for \textit{smooth} projective curves and that of A. Conca and J. Sidman \cite{CS} for \textit{smooth} complete intersection curves in $\p^3$. The case of singular curves was motivated by \cite[Example 4.3]{CS} due to A. Conca and J. Sidman. We also provide some illuminating examples of our results via calculations done with {\it Macaulay 2} and \texttt {Singular} \cite{DGPS, GS}.