On the structure of the Galois group of the maximal pro-p extension with restricted ramification over the cyclotomic Zp-extension

Abstract

Let k∞ be the cyclotomic Zp-extension of an algebraic number field k. We denote by S a finite set of prime numbers which does not contain p, and S(k∞) the set of primes of k∞ lying above S. In the present paper, we will study the structure of the Galois group XS (k∞) of the maximal pro-p extension unramified outside S (k∞) over k∞. We mainly consider the question whether XS (k∞) is a non-abelian free pro-p group or not. In the former part, we treat the case when k is an imaginary quadratic field and S = (here p is an odd prime number which does not split in k). In the latter part, we treat the case when k is a totally real field and S ≠ .