The Local Bourbaki Degree of a Plane Projective Curve

Abstract

The Bourbaki degree of a plane projective curve F, denoted by Bour(F), was introduced in Marcos by Jardim, Nejad and Simis. It is defined as the degree of R/Iε, where R = k[x,y,z] is the graded polynomial ring, with k algebraically closed, and Iε ⊂eq R is the Bourbaki ideal associated with a minimal generator ε of the module of first syzygies of the Jacobian ideal JF. In this work, we propose the definition of the local Bourbaki degree at a point P ∈ P2, denoted by BourP(F), and prove that Bour(F) = ΣP ∈ P2BourP(F). Furthermore, we present results that follow from this local definition, which are instrumental in determining the Bourbaki degree and in establishing whether a curve is (nearly) free. In addition, we provide examples of computing the Bourbaki degree via the local formula - an approach that is computationally advantageous, as it, generically, demands fewer calculations.