Abel universal functions: boundary behaviour and Taylor polynomials

Abstract

A holomorphic function f on the unit disc D belongs to the class UA(D) of Abel universal functions if the family \fr: 0≤ r<1\ of its dilates fr(z):=f(rz) is dense in the space of continuous functions on K, for any proper compact subset K of the unit circle. It has been recently shown that UA(D) is a dense Gδ subset of the space of holomorphic functions on D endowed with the topology of local uniform convergence. In this paper, we develop further the theory of universal radial approximation by investigating the boundary behaviour of functions in UA(D) (local growth, existence of Picard points and asymptotic values) and the convergence properties of their Taylor polynomials outside D.

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