English

Five-dimensional compatible systems and the Tate conjecture for elliptic surfaces

Number Theory 2026-04-13 v2 Algebraic Geometry

Abstract

Let (ρλ ⁣:GQGL5(Eλ))λ(\rho_\lambda\colon G_{\mathbb Q}\to \operatorname{GL}_5(\overline{E}_\lambda))_\lambda be a strictly compatible system of Galois representations such that no Hodge--Tate weight has multiplicity 55. Under mild assumptions, we show that if ρλ0\rho_{\lambda_0} is irreducible for some λ0\lambda_0, then ρλ\rho_\lambda is irreducible for all but finitely many priimes λ\lambda. More generally, if (ρλ)λ(\rho_\lambda)_\lambda is essentially self-dual, we show that either ρλ\rho_\lambda is irreducible for all but finitely many λ\lambda, or the compatible system (ρλ)λ(\rho_\lambda)_\lambda decomposes as a direct sum of lower-dimensional compatible systems. We apply our results to study the Tate conjecture for elliptic surfaces. For example, if X0 ⁣:y2+(t+3)xy+y=x3X_0\colon y^2 + (t+3)xy + y= x^3, we prove the codimension one \ell-adic Tate conjecture for all but finitely many \ell, for all but finitely many general, degree 33, genus 22 branched multiplicative covers of X0X_0. To prove this result, we classify the elliptic surfaces into six families, and prove, using perverse sheaf theory and a result of Cadoret--Tamagawa, that if one surface in a family satisfies the Tate conjecture, then all but finitely many do. We then verify the Tate conjecture for one representative of each family by making our irreducibility result explicit: for the compatible system arising from the transcendental part of Het2(XQ,Q(1))H^2_{\mathrm{et}}(X_{\overline{\mathbb Q}}, \mathbb{Q}_\ell(1)) for a representative XX, we formulate an algorithm that takes as input the characteristic polynomials of Frobenius, and terminates if and only if the compatible system is irreducible.

Keywords

Cite

@article{arxiv.2406.03617,
  title  = {Five-dimensional compatible systems and the Tate conjecture for elliptic surfaces},
  author = {Lian Duan and Xiyuan Wang and Ariel Weiss},
  journal= {arXiv preprint arXiv:2406.03617},
  year   = {2026}
}

Comments

57 pages. Numerous corrections following peer review. Comments welcome!

R2 v1 2026-06-28T16:55:08.438Z