TheN/D-Conjecture for Nonresonant Hyperplane Arrangements
Abstract
This paper studies Bernstein--Sato polynomials bf,0 for homogeneous polynomials f of degree d with n variables. It is open to know when -n d is a root of bf,0. For essential indecomposable hyperplane arrangements, this is a conjecture by Budur, Mustata and Teitler and implies the strong topological monodromy conjecture for arrangements. Walther gave a sufficient condition that a certain differential form does not vanish in the top cohomology group of Milnor fiber. We use Walther's result to verify the n d-conjecture for weighted hyperplane arrangements satisfying the nonresonant condition.
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