Almost all primes are partially regular

Abstract

For odd primes p, we let Kp:=Q(ζp) be the pth cyclotomic field and let ω denote its Teichmuller character. For α>1/2, we say that an odd prime p is partially regular if the eigenspaces of the p-Sylow subgroup of Cl(Kp) under the Galois action vanish for all characters ωp-2k with \[ 2 2k p( p)α. \] Equivalently, p num(B2k) throughout this range. We prove that a density-one subset of primes is partially regular in this sense. By Leopoldt reflection, this yields a partial Vandiver Theorem: for a density-one set of primes p, the even eigenspaces Ap(ω2k) vanish for all even 2k satisfying the inequality above. This result has consequences for Kubota-Leopoldt p-adic L-functions, congruences between cusp forms and Eisenstein series, and p-torsion in algebraic K-groups. The theorem proving partial regularity for almost all p is fully formalized in Lean/Mathlib and was produced automatically by AxiomProver from a natural-language statement of the conjecture.