Construction of class fields over imaginary biquadratic fields

Abstract

Let K be an imaginary biquadratic field and K1, K2 be its imaginary quadratic subfields. For integers N>0, μ≥ 0 and an odd prime p with (N,p)=1, let K(Npμ) and (Ki)(Npμ) for i=1,2 be the ray class fields of K and Ki, respectively, modulo Npμ. We first present certain class fields KN,p,μ1,2 of K, in the sense of Hilbert, which are generated by Siegel-Ramachandra invariants of (Ki)(Npμ+1) for i=1,2 over K(Npμ) and show that K(Npμ+1)=KN,p,μ1,2 for almost all μ.