On Kervaire--Murthy conjecture, Bernoulli and Iwasawa numbers, and zeroes of p-adic L-function

Abstract

The aim of the present paper is to establish relations between Iwasawa and Bernoulli numbers based on some results by M. Kervaire and M. P. Murthy about the structure of the K0 groups of the integer group rings of cyclic groups of prime power order pn . In particular, we will prove that λi≤ p-1 under assumption that the generalized Bernoulli number B1,ω-i is not divisible by p2. Here ω is the Teichm\"uller character of Z/(p-1)Z. λi=1 if B1,ω-i is divisible by p2. We will prove that Sn,i Z/(pn+ki), where Sn is the Sylow p-subgroup of the class group of the field Q(ζn). Here, ζn is a primitive pn+1-root of unity, i are idempotents in the group ring Zp[ Gal(Q (ζ0) /Q)], Sn,i=i (Sn), and ki is the p-adic valuation of B1,ω-i. At the end we will prove that ki ≤ 1 and also vp (Lp (0, ωj))≤ 1 for even j under certain conditions on zeroes of Lp (0, ωj) . Throughout the paper we assume that p satisfies Vandiver's conjecture.