Parametric representation of univalent functions with boundary regular fixed points

Abstract

Given a set S of conformal maps of the unit disk D into itself that is closed under composition, we address the question whether S can be represented as the reachable set of a Loewner - Kufarev - type ODE dwt/dt=Gt wt, w0=id D, where the control functions t Gt form a convex cone M S. For the set of all conformal : D D with (0)=0, '(0)>0, an affirmative answer to this question is the essence of Loewner's well-known Parametric Representation of univalent functions [Math. Ann. 89 (1923), 103-121]. In this paper, we study classes of conformal self-maps defined by their boundary regular fixed points and, in part of the cases, establish their Loewner-type representability.