On the composite fields of two cubic cyclic extension fields over a number field (Q1801762)

The composite field of two cubic cyclic extension fields over a number field has four intermediate fields of degree 3. In the same journal [ibid. 34, 973-976 (1989; Zbl 0722.11049)], the author considered the condition on an element \(\lambda\) in a number field \(K\) for the splitting field \(F(K,\lambda)\) of \(f_ \lambda(x)=2x^ 3+(\lambda-3)x^ 2- (\lambda+3)x+2\) to be a cubic cyclic extension over \(K\). In this paper, by using such result he shows that the composite field of \(L_ i(K,\mu_ i)\) \((i=1,2)\) has two other intermediate subfields \(L_ 3=F(K,\mu_ 1)\), \(L_ 4=F(K,\mu_ 2)\), where \(\mu_ 1={{\lambda_ 1 \lambda_ 2-27} \over {\lambda_ 1+\lambda_ 2}}\), \(\mu_ 2={{\lambda_ 1 \lambda_ 2+27} \over {\lambda_ 1-\lambda_ 2}}\).