On divisibility of class number of real Abelian fields of prime conductor

For a totally real field of prime power conductor, we determine the Fitting ideal over the Galois group ring of the ideal class group and of the narrow ideal class group. 1998 Academic Press ## 1. Introduction In this paper we prove a structure result on the ideal class group and on the narrow id

We introduce a generalized Demjanenko matrix associated with an arbitrary abelian field of odd prime power conductor, and exhibit direct connections between this matrix and both the relative class number and the cyclotomic units of the field. Beyond using the analytic class number formula, all argum

Let k be a real abelian number field and p an odd prime. We give a criterion for the vanishing of the \*-invariant for the Z p -extension of k and apply it to give some examples of \*=0.

Suppose g > 2 is an odd integer. For real number X > 2, define S g ðX Þ the number of squarefree integers d4X with the class number of the real quadratic field Qð ffiffiffi d p Þ being divisible by g. By constructing the discriminants based on the work of Yamamoto, we prove that a lower bound S g ðX