English

$\mathcal L$-invariants and deep congruences between newforms

Number Theory 2026-02-18 v1

Abstract

We study congruences modulo powers of a prime pp between pairs of pp-new modular Hecke eigenforms of level Γ0(p)\Gamma_0(p) and same weight kk. Based on explicit computations, we conjecture that every such eigenform ff admits a twin to which it is congruent modulo a surprisingly high power of pp, whose exponent is close to the opposite of the valuation of the L\mathcal L-invariant of ff, and whose Atkin--Lehner sign is opposite to that of ff. This is a new phenomenon that is not explained by the known results on the pp-adic variation of eigenforms. Inspired by the global picture, we formulate a local conjecture describing congruences between semistable representations of fixed weight, varying L\mathcal L-invariant, and opposite Atkin--Lehner signs. We give some theoretical evidence towards our conjectures.

Keywords

Cite

@article{arxiv.2602.15211,
  title  = {$\mathcal L$-invariants and deep congruences between newforms},
  author = {Andrea Conti and Peter Mathias Gräf},
  journal= {arXiv preprint arXiv:2602.15211},
  year   = {2026}
}

Comments

14 pages

R2 v1 2026-07-01T10:39:18.852Z