Zygmund's theorem for harmonic quasiregular mappings

Abstract

Given an analytic function f=u+iv in the unit disk D, Zygmund's theorem gives the minimal growth restriction on u which ensures that v is in the Hardy space h1. This need not be true if f is a complex-valued harmonic function. However, we prove that Zygmund's theorem holds if f is a harmonic K-quasiregular mapping in . Our work makes further progress on the recent Riesz-type theorem of Liu and Zhu (Adv. Math., 2023), and the Kolmogorov-type theorem of Kalaj (J. Math. Anal. Appl., 2025), for harmonic quasiregular mappings. We also obtain a partial converse, thus showing that the proposed growth condition is the best possible. Furthermore, as an application of the classical conjugate function theorems, we establish a harmonic analogue of a well-known result of Hardy and Littlewood.