The Borel-Ritt problem in Beurling ultraholomorphic classes

Abstract

We give a complete solution to the Borel-Ritt problem in non-uniform spaces A-(M)(S) of ultraholomorphic functions of Beurling type, where S is an unbounded sector of the Riemann surface of the logarithm and M is a strongly regular weight sequence. Namely, we characterize the surjectivity and the existence of a continuous linear right inverse of the asymptotic Borel map on A-(M)(S) in terms of the aperture of the sector S and the weight sequence M. Our work improves previous results by Thilliez [10] and Schmets and Valdivia [9].