Spectral halo for Hilbert modular forms
Abstract
Let be a totally real field and be an odd prime which splits completely in . We prove that the eigenvariety associated to a definite quaternion algebra over satisfies the following property: over a boundary annulus of the weight space, the eigenvariety is a disjoint union of countably infinitely many connected components which are finite over the weight space; on each fixed connected component, the ratios between the -slopes of points and the -adic valuations of the -parameters are bounded by explicit numbers, for all primes of over . Applying Hansen's -adic interpolation theorem, we are able to transfer our results to Hilbert modular eigenvarieties. In particular, we prove that on every irreducible component of Hilbert modular eigenvarieties, as a point moves towards the boundary, its slope goes to zero. In the case of eigencurves, this completes the proof of Coleman-Mazur's `halo' conjecture.
Cite
@article{arxiv.2005.14267,
title = {Spectral halo for Hilbert modular forms},
author = {Rufei Ren and Bin Zhao},
journal= {arXiv preprint arXiv:2005.14267},
year = {2021}
}
Comments
65 pages, 1 figure