2,604 research outputs found
Unitary local systems, multiplier ideals, and polynomial periodicity of Hodge numbers
The space of unitary local systems of rank one on the complement of an
arbitrary divisor in a complex projective algebraic variety can be described in
terms of parabolic line bundles. We show that multiplier ideals provide natural
stratifications of this space. We prove a structure theorem for these
stratifications in terms of complex tori and convex rational polytopes,
generalizing to the quasi-projective case results of Green-Lazarsfeld and
Simpson. As an application we show the polynomial periodicity of Hodge numbers
of congruence covers in any dimension, generalizing results of E. Hironaka and
Sakuma. We extend the structure theorem and polynomial periodicity to the
setting of cohomology of unitary local systems. In particular, we obtain a
generalization of the polynomial periodicity of Betti numbers of unbranched
congruence covers due to Sarnak-Adams. We derive a geometric characterization
of finite abelian covers, which recovers the classic one and the one of
Pardini. We use this, for example, to prove a conjecture of Libgober about
Hodge numbers of abelian covers.Comment: final version, to appear in Adv. Mat
On Hodge spectrum and multiplier ideals
We describe a relation between two invariants that measure the complexity of
a hypersurface singularity. One is the Hodge spectrum which is related to the
monodromy and the Hodge filtration on the cohomology of the Milnor fiber. The
other is the multiplier ideal, having to do with log resolutions.Comment: shorter final version to appear in Math. An
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