Tate properties, polynomial-count varieties, and monodromy of hyperplane arrangements
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Publication:2894136
DOI10.1215/00277630-1548502zbMath1242.32014arXiv1012.1437OpenAlexW2963462752MaRDI QIDQ2894136
Publication date: 28 June 2012
Published in: Nagoya Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1012.1437
Relations with arrangements of hyperplanes (32S22) Complex surface and hypersurface singularities (32S25) Milnor fibration; relations with knot theory (32S55) Mixed Hodge theory of singular varieties (complex-analytic aspects) (32S35)
Related Items
Homology graph of real arrangements and monodromy of Milnor fiber, On the syzygies and Hodge theory of nodal hypersurfaces, Abelian duality and propagation of resonance, Cohomology of the Milnor Fibre of a Hyperplane Arrangement with Symmetry, Computing Milnor fiber monodromy for some projective hypersurfaces, ON THE MILNOR MONODROMY OF THE IRREDUCIBLE COMPLEX REFLECTION ARRANGEMENTS, Spectrum of Hyperplane Arrangements in Four Variables
Cites Work
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- Quasi-Kähler groups, 3-manifold groups, and formality
- Eigenvalues of Frobenius and Hodge numbers
- Picard-Lefschetz monodromy of products
- Jumping coefficients and spectrum of a hyperplane arrangement
- Mixed Hodge polynomials of character varieties. With an appendix by Nicholas M. Katz.
- Combinatorics and topology of complements of hyperplanes
- Singularities and topology of hypersurfaces
- Real homotopy theory of Kähler manifolds
- Infinitesimal computations in topology
- The Milnor fiber of a generic arrangement
- Torsion in Milnor fiber homology
- Sheaves in topology
- Local systems over complements of hyperplanes and the Kac-Kazhdan conditions for singular vectors
- On the homotopy types of hypersurfaces defined by weighted homogeneous polynomials
- On combinatorial invariance of the cohomology of Milnor fiber of arrangements and Catalan equation over function field
- Finite Galois covers, cohomology jump loci, formality properties, and multinets
- Non-formality of Milnor fibres of line arrangements
- The l Adic Cohomology of Hyperplane Complements
- The Mixed Hodge Structure of the Complement to an Arbitrary Arrangement of Affine Complex Hyperplanes is Pure
- Weights in Cohomology Groups Arising from Hyperplane Arrangements
- On Milnor Fibrations of Arrangements
- Hodge-Deligne equivariant polynomials and monodromy of hyperplane arrangements
