Riesz type theorems for $κ$-pluriharmonic mappings, invariant harmonic quasiregular mappings and harmonic quasiregular mappings (2310.15452v2)

Abstract: The main purpose of this paper is to develop some methods to improve and generalize the main results in a paper by Liu and Zhu (Adv. Math., 2023, i.e., \cite{L-Z}). The paper consists of two parts. In the first part, we discuss the Riesz type theorem in the setting of $n$-dimensional complex spaces for all $n\geq 1$. In this part, we first introduce the family of $\kappa$-pluriharmonic mappings of the $n$-dimensional complex unit ball. Then we establish two Riesz type theorems for these mappings, which are the $n$-dimensional versions of Theorems 1.1 and 1.2 in \cite{L-Z}, respectively. Furthermore, even when $n=1$, our first result shows that the assumption of the real parts of the mappings not being negative (or being negative) in \cite[Theorem 1.1]{L-Z} is redundant; and our second result illustrates that the assumption of "quasiconformality" on the mappings in \cite[Theorem 1.2]{L-Z} can be replaced by the weaker one of "quasiregularity". In the second part, we investigate the Riesz type theorem in the setting of $n$-dimensional real spaces for all $n\geq 2$. In this part, first, we prove a Riesz type theorem for invariant harmonic quasiregular mappings of the unit $n$-dimensional real ball. Our result indicates that $(i)$ the range of the parameter $p$ discussed in \cite[Theorem 1.3]{L-Z} can be changed from $(1,2)$ to $(1,\infty)$; $(ii)$ the assumption of the first coordinate functions of the mappings being non-zero in \cite[Theorem 1.3]{L-Z} is redundant. In this way, we complete the discussions carried out in \cite[Theorems 1.3 and 1.4]{L-Z}. Second, we obtain a Riesz type theorem for harmonic $K$-quasiregular mappings of the unit $n$-dimensional real ball. Our result demonstrates that the range of the parameter $p$ discussed in \cite[Theorem 2.1]{K-2023} can be changed from $(1,2)$ to $(1,\infty)$.