Lefschetz properties of Jacobian algebras and Jacobian modules

Abstract

Let V:f=0 be a hypersurface of degree d ≥ 3 in the complex projective space Pn, n ≥ 3, having only isolated singularities. Let M(f) be the associated Jacobian algebra and H: =0 be a hyperplane in Pn avoiding the singularities of V, but such that V H is singular. We related the Lefschetz type properties of the linear maps : M(f)k M(f)k+1 induced by the multiplication by linear form to the singularities of the hyperplane section V H. Similar results are obtained for the Jacobian module N(f).