Xiaotong Liang, Chunxue Duan, Zihan Su,
Yonghong Xie
AIMS Mathematics 2025, 10(12): 29132-29150
Published: 11 December 2025
Clifford analysis is a fundamental framework for extending complex function theory to high-dimensional spaces, where -monogenic functions (high-order generalizations of monogenic functions) play a pivotal role in geometric function theory and partial differential equations. However, there is a paucity of research findings regarding the Möbius transformations of -monogenic functions for arbitrary . In this paper, we first derived that the composite function constructed from a -monogenic function and a Möbius transformation remains -monogenic when , and was generalized to the general case. Then, as applications, we proved the Schwarz-Pick-type lemma for harmonic functions using a new method, and we gave a version of the Schwarz-Pick-type lemma for inframonogenic functions. This work fills the gap in the transformation theory of -monogenic functions, enriches the family of Schwarz-Pick-type lemmas in Clifford analysis, and provides theoretical tools to solve research related to high-dimensional geometric function theory.