The Main Conjecture for Imaginary quadratic fields for the split prime p=2

Abstract

Let K be an imaginary quadratic field such that 2 splits into two primes p and p. Let K∞ be the unique Z2-extension of K unramified outside p. Let f be an ideal coprime to p and L be an arbitrary extension of K contained in the ray class field K(p2f). Let L∞=K∞L and let M be the maximal p-abelian, p-ramified extension of L∞. We set X=Gal(M/L∞). In this paper we prove the Iwasawa main conjecture for the module X.