English

Modular equalities for complex reflection arrangements

Algebraic Geometry 2017-02-22 v2 Combinatorics Group Theory

Abstract

We compute the combinatorial Aomoto-Betti numbers βp(A)\beta_p(\mathcal{A}) of a complex reflection arrangement. When A\mathcal{A} has rank at least 33, we find that βp(A)2\beta_p(\mathcal{A})\le 2, for all primes pp. Moreover, βp(A)=0\beta_p(\mathcal{A})=0 if p>3p>3, and β2(A)0\beta_2(\mathcal{A})\ne 0 if and only if A\mathcal{A} is the Hesse arrangement. We deduce that the multiplicity ed(A)e_d(\mathcal{A}) of an order dd eigenvalue of the monodromy action on the first rational homology of the Milnor fiber is equal to the corresponding Aomoto-Betti number, when dd is prime. We give a uniform combinatorial characterization of the property ed(A)0e_d(\mathcal{A})\ne 0, for 2d42\le d\le 4. We completely describe the monodromy action for full monomial arrangements of rank 33 and 44. We relate ed(A)e_d(\mathcal{A}) and βp(A)\beta_p(\mathcal{A}) to multinets, on an arbitrary arrangement.

Keywords

Cite

@article{arxiv.1406.7137,
  title  = {Modular equalities for complex reflection arrangements},
  author = {Daniela Anca Macinic and Stefan Papadima and Clement Radu Popescu},
  journal= {arXiv preprint arXiv:1406.7137},
  year   = {2017}
}

Comments

v2:final version

R2 v1 2026-06-22T04:49:06.450Z