Mathematics – Algebraic Geometry
Scientific paper
2012-01-17
Mathematics
Algebraic Geometry
A full characterization of the logarithmic comparison theorem for Koszul free divisors has been added; a precise question abou
Scientific paper
In this paper we prove that the Bernstein-Sato polynomial of any free divisor for which the $D[s]$-module $D[s] h^s$ admits a Spencer logarithmic resolution satisfies the symmetry property $b(-s-2) = \pm b(s)$. This applies in particular to locally quasi-homogeneous free divisors, or more generally, to free divisors of linear Jacobian type. We also prove that the Bernstein-Sato polynomial of an integrable logarithmic connection $E$ and of its dual $E^*$ with respect to a free divisor of linear Jacobian type are related by the equality $b_{E}(s)=\pm b_{E^*}(-s-2)$. Our results are based on the behaviour of the modules $D[s] h^s$ and $D[s] E[s]h^s $ under duality.
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