Research Article Open Access

Fixed Point Theorems for Mappings Satisfying Weak Nonexpansivity Condition (Weak Contractivity Condition) into (from) Cartesian Products Normed Spaces

Sahar Mohamed Ali Abou Bakr1
  • 1 Ain Shams University, Egypt

Abstract

This paper suggests new types of weak nonexpansive mappings defined from normed space X into its Cartesian product X × X, studies the main features of the fixed points for those mappings and extends the concept of (C)-contractivity condition introduced in some previous research papers. On other side, it introduces new types of contraction mappings with a mixed monotone property; the {a, b, c} M-first type and the {a, b, c} M-second type contractions, these types are defined from the Cartesian product space X × X into X, where X is a sequentially ordered Banach space, proves the existence of first-anti-second and second-anti-first couple fixed points of such types and generalizes some of the results given before.

Journal of Mathematics and Statistics
Volume 13 No. 2, 2017, 88-97

DOI: https://doi.org/10.3844/jmssp.2017.88.97

Submitted On: 13 September 2016 Published On: 11 April 2017

How to Cite: Bakr, S. M. A. A. (2017). Fixed Point Theorems for Mappings Satisfying Weak Nonexpansivity Condition (Weak Contractivity Condition) into (from) Cartesian Products Normed Spaces. Journal of Mathematics and Statistics, 13(2), 88-97. https://doi.org/10.3844/jmssp.2017.88.97

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Keywords

  • Contraction
  • Nonexpansive
  • Quasi Nonexpansiveness Types of Mappings
  • Mixed Monotone Operators
  • Mixed Monotone Property
  • FIXED Points
  • Couple Fixed Points
  • MSC: 46, 4705, 47H09, 47H10