The p-adic limits of class numbers in Zp-towers

Abstract

This article discusses variants of Weber's class number problem in the spirit of arithmetic topology to connect the results of Sinnott--Kisilevsky and Kionke. Let p be a prime number. We first prove the p-adic convergence of class numbers in a Zp-extension of a global field and a similar result in a Zp-cover of a compact 3-manifold. Secondly, we establish an explicit formula for the p-adic limit of the p-power-th cyclic resultants of a polynomial using roots of unity of orders prime to p, the p-adic logarithm, and the Iwasawa invariants. Finally, we give thorough investigations of torus knots, twist knots, and elliptic curves; we complete the list of the cases with p-adic limits being in Z and find the cases such that the base p-class numbers are small and 's are arbitrarily large.