Univalent polynomials and Koebe's one-quarter theorem

Abstract

The famous Koebe 14 theorem deals with univalent (i.e., injective) analytic functions f on the unit disk D. It states that if f is normalized so that f(0)=0 and f'(0)=1, then the image f( D) contains the disk of radius 14 about the origin, the value 14 being best possible. Now suppose f is only allowed to range over the univalent polynomials of some fixed degree. What is the optimal radius in the Koebe-type theorem that arises? And for which polynomials is it attained? A plausible conjecture is stated, and the case of small degrees is settled.