English

Constructing Galois representations with large Iwasawa $\lambda$-Invariant

Number Theory 2024-04-12 v3

Abstract

Let p5p\geq 5 be a prime. We construct modular Galois representations for which the Zp\mathbb{Z}_p-corank of the pp-primary Selmer group (i.e., λ\lambda-invariant) over the cyclotomic Zp\mathbb{Z}_p-extension is large. More precisely, for any natural number nn, one constructs a modular Galois representation such that the associated λ\lambda-invariant is n\geq n. The method is based on the study of congruences between modular forms, and leverages results of Greenberg and Vatsal. Given a modular form f1f_1 satisfying suitable conditions, one constructs a congruent modular form f2f_2 for which the λ\lambda-invariant of the Selmer group is large. A key ingredient in acheiving this is the Galois theoretic lifting result of Fakruddin-Khare-Patrikis, which extends previous work of Ramakrishna. The results are subject to certain additional hypotheses, and are illustrated by explicit examples.

Keywords

Cite

@article{arxiv.2105.00147,
  title  = {Constructing Galois representations with large Iwasawa $\lambda$-Invariant},
  author = {Anwesh Ray},
  journal= {arXiv preprint arXiv:2105.00147},
  year   = {2024}
}

Comments

Version 3: Final version, accepted for publication in Annales Math Quebec

R2 v1 2026-06-24T01:41:28.041Z