Gauss-Manin connections for arrangements, IV. Nonresonant eigenvalues

Authors

Daniel C. Cohen, Louisiana State University
Peter Orlik, University of Wisconsin-Madison

Document Type

Article

Publication Date

1-1-2006

Abstract

An arrangement is a finite set of hyperplanes in a finite dimensional complex affine space. A complex rank one local system on the arrangement complement is determined by a set of complex weights for the hyperplanes. We study the Gauss-Manin connection for the moduli space of arrangements of fixed combinatorial type in the cohomology of the complement with coefficients in the local system determined by the weights. For nonresonant weights, we solve the eigenvalue problem for the endomorphisms arising in the 1-form associated to the Gauss-Manin connection. © Swiss Mathematical Society.

Publication Source (Journal or Book title)

Commentarii Mathematici Helvetici

First Page

883

Last Page

909

Recommended Citation

Cohen, D., & Orlik, P. (2006). Gauss-Manin connections for arrangements, IV. Nonresonant eigenvalues. Commentarii Mathematici Helvetici, 81 (4), 883-909. https://doi.org/10.4171/CMH/79