On the failure of Bombieri's conjecture for univalent functions

Abstract

A conjecture of Bombieri states that the coefficients of a normalized univalent function f should satisfy f K n- Re\,anm- Re\,am = t∈ R \, n t -(nt)m t -(mt), when f approaches the Koebe function K(z)=z(1-z)2. Recently, Leung disproved this conjecture for n=2 and for all m≥3 and, also, for n=3 and for all odd m≥5. Complementing his work we disprove it for all m>n≥2 which are simultaneously odd or even and, also, for the case when m is odd, n is even and n≤ m+12. We mostly make use of trigonometry, but also employ Dieudonn\'e's criterion for the univalence of polynomials.