There are no universal ternary quadratic forms over biquadratic fields

Abstract

We study totally positive definite quadratic forms over the ring of integers OK of a totally real biquadratic field K=Q(m, s). We restrict our attention to classical forms (i.e., those with all non-diagonal coefficients in 2OK) and prove that no such forms in three variables are universal (i.e., represent all totally positive elements of OK). This provides further evidence towards Kitaoka's conjecture that there are only finitely many number fields over which such forms exist. One of our main tools are additively indecomposable elements of OK; we prove several new results about their properties.