Complex convexity and fixed point theorems in Orlicz modular spaces

Lili Chen; Deyun Chen; Yang Jiang

doi:10.4064/bc119-3

Publishing house / Banach Center Publications / All volumes

Complex convexity and fixed point theorems in Orlicz modular spaces

Volume 119 / 2019

Lili Chen, Deyun Chen, Yang Jiang Banach Center Publications 119 (2019), 47-56 MSC: Primary 46B20; Secondary 46E30. DOI: 10.4064/bc119-3

Abstract

In this paper, we prove that every Orlicz modular function space $L_{\Phi ,\rho }$ is complex midpoint locally uniformly convex. As a corollary, $L_{\Phi ,\rho }$ is also complex strictly convex. Furthermore, we introduce the notions of mean nonexpansive mappings in the modular sense and prove a fixed point theorem in Orlicz modular function spaces.

Authors

Lili ChenCollege of Mathematics and Systems Science
Shandong University of Science and Technology
Qingdao 266590, China
and
Department of Mathematics
Harbin University of Science and Technology
Harbin 150080, China
e-mail
Deyun ChenCollege of Computer Science and Technology
Harbin University of Science and Technology
Harbin 150080, China
e-mail
Yang JiangDepartment of Mathematics
Harbin University of Science and Technology
Harbin 150080, China
e-mail

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Publishing house / Banach Center Publications / All volumes

Banach Center Publications

Complex convexity and fixed point theorems in Orlicz modular spaces

Volume 119 / 2019

Abstract

Authors

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