On the Jacobian ideal of central arrangements

Abstract

Let A denote a central hyperplane arrangement of rank n in affine space Kn over an infinite field K and let l1,…, lm∈ R:= K[x1,…,xn] denote the linear forms defining the corresponding hyperplanes, along with the corresponding defining polynomial f:=l1·s lm∈ R. Let Jf denote the ideal generated by the partial derivatives of f and let I designate the ideal generated by the (m-1)-fold products of l1,…, lm. This paper is centered on the relationship between the two ideals Jf, I⊂ R, their properties and two conjectures related to them. Some parallel results are obtained in the case of forms of higher degrees provided they fulfill a certain transversality requirement.

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