Sharp Riesz conjugate functions theorems for quasiregular mappings

Abstract

One of the celebrated results by Riesz Rie is the Riesz conjugate functions theorem for analytic functions in the complex plane C. The study on the Riesz conjugate functions theorem for functions in higher dimensional spaces has attracted much attention. Fefferman and Stein FS-1972 established the Riesz conjugate functions theorem for the Cauchy-Riemann systems in the upper half real space Rn+1+. Astala and Koskela AS-2 investigated the Riesz conjugate functions theorem for quasiconformal mappings of the unit ball Bn in Rn, and posed an open problem which is as follows: Does there exist a quasiconformal analog for the Riesz theorem on conjugate functions? The purpose of this paper is to develop some methods to study this topic further, in particular, Astala-Koskela's open problem. First, we prove a sharp Riesz conjugate functions theorem for a class of quasiregular mappings of Bn for all n≥ 2 which satisfy the so-called Heinz's nonlinear differential inequality. As a direct consequence of this result, we find that the answer to Astala-Koskela's open problem is affirmative for harmonic quasiregular mappings of Bn for all n≥ 2. Second, we obtain a sharp Riesz conjugate functions theorem for invariant harmonic K-quasiregular mappings of Bn for all n≥ 2 which shows that the answer to Astala-Koskela's open problem is affirmative for these mappings. At last, we introduce the family of -pluriharmonic mappings of the unit ball Bn in Cn, and establish a sharp Riesz conjugate functions theorem for these mappings for all n≥ 1. Consequently, we generalize and improve all main results by Liu and Zhu L-Z.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…