Parametric representations and boundary fixed points of univalent self-maps of the unit disk

Abstract

A classical result in the theory of Loewner's parametric representation states that the semigroup U* of all conformal self-maps φ of the unit disk D normalized by φ(0) = 0 and φ'(0) > 0 can be obtained as the reachable set of the Loewner - Kufarev control system d wtd t=Gt wt, t≥slant0, w0=idD, where the control functions t Gt∈Hol(D,C) form a certain convex cone. Here we extend this result to the semigroup U[F] consisting of all conformal φ:D whose set of boundary regular fixed points contains a given finite set F⊂∂D and to its subsemigroup Uτ[F] formed by idD and all φ∈ U[F]\idD\ with the prescribed boundary Denjoy - Wolff point τ∈∂D F. This completes the study launched in [P. Gumenyuk, Preprint 2016, ArXiv:1603.04043], where the case of interior Denjoy - Wolff point τ∈D was considered.