On a Generalized Monodromy Conjecture for Curves using Differential Forms
Abstract
Motivic and topological zeta functions are singularity invariants, mainly associated to a function and a top differential form on a smooth variety. When is the standard form on affine -space, the monodromy conjecture states that poles of these zeta functions should induce monodromy eigenvalues of . We study natural generalized statements of the monodromy conjecture for functions on complex surface germs; more precisely on singular surfaces for forms that generalize the standard form, and on the affine plane for forms that are intrinsically associated to . For all cases, we provide counterexamples to the statement. In addition, when the intrinsically associated is given by the generic polar of , we discover a relation between the poles of the zeta functions and the intersection behaviour of the polar curve.
Keywords
Cite
@article{arxiv.2602.13109,
title = {On a Generalized Monodromy Conjecture for Curves using Differential Forms},
author = {Lise Fonteyne and Willem Veys},
journal= {arXiv preprint arXiv:2602.13109},
year = {2026}
}