Heuristics in direction of a p-adic Brauer--Siegel theorem

Abstract

Let p be a fixed prime number. Let K be a totally real number field of discriminant D\K and let T\K be the torsion group of the Galois group of the maximal abelian p-ramified pro-p-extension of K (under Leopoldt's conjecture). We conjecture the existence of a constant C\p>0 such that log(\#T\K) C\p log((D\K)) when K varies in some specified families (e.g., fields of fixed degree). In some sense, we suggest the existence of a p-adic analogue, of the classical Brauer--Siegel Theorem, wearing here on the valuation of the residue at s=1 (essentially equal to \#T\K) of the p-adic zeta-function zeta\p(s) of K.We shall use a different definition that of Washington, given in the 1980's, and approach this question via the arithmetical study of T\K since p-adic analysis seems to fail because of possible abundant "Siegel zeros" of zeta\p(s), contrary to the classical framework.We give extensive numerical verifications for quadratic and cubic fields (cyclic or not) and publish the PARI/GP programs directly usable by the reader for numerical improvements. Such a conjecture (if exact) reinforces our conjecture that any fixed number field K is p-rational (i.e., T\K=1) for all p >> 0 .