Discriminant-Stability in p-adic Lie Towers of Number Fields

Abstract

In this paper we consider a tower of number fields ·s ⊃eq K(1) ⊃eq K(0) ⊃eq K arising naturally from a continuous p-adic representation of Gal(Q/K), referred to as a p-adic Lie tower over K. A recent conjecture of Daqing Wan hypothesizes, for certain p-adic Lie towers of curves over Fp, a stable (polynomial) growth formula for the genus. Here we prove the analogous result in characteristic zero, namely: the p-adic valuation of the discriminant of the extension K(i)/K is given by a polynomial in i,pi for i sufficiently large. This generalizes a previously known result on discriminant-growth in Zp-towers of local fields of characteristic zero.