The Cassels heights of cyclotomic integers

Abstract

We study the set C of mean square values of the moduli of the conjugates of cyclotomic integers β. For its kth derived set C(k), we show that C(k)=(k+1) C\,\, (k 0), so that also C(k)+ C()= C(k++1)\,\,(k, 0). We also calculate the order type of C, and show that it is the same as that of the set of PV numbers. Furthermore, we describe precisely the restricted set Cp where the β are confined to the ring Z[ωp], where p is an odd prime and ωp is a primitive pth root of unity. In order to do this, we prove that both of the quadratic polynomials a2+ab+b2+c2+a+b+c and a2+b2+c2+ab+bc+ca+a+b+c are universal.