Domains of variability of Laurent coefficients and the convex hull for the family of concave univalent functions

Abstract

Let denote the open unit disc and let p∈ (0,1). We consider the family Co(p) of functions f: that satisfy the following conditions: [(i)] f is meromorphic in and has a simple pole at the point p. [(ii)] f(0)=f'(0)-1=0. [(iii)] f maps conformally onto a set whose complement with respect to is convex. We determine the exact domains of variability of some coefficients an(f) of the Laurent expansion f(z)=Σn=-1∞ an(f)(z-p)n, |z-p|<1-p, for f∈ Co(p) and certain values of p. Knowledge on these Laurent coefficients is used to disprove a conjecture of the third author on the closed convex hull of Co(p) for certain values of p.