Dear Colleagues,

Fixed point theory is a fascinating subject that has a wide range of applications in many areas of mathematics. Brouwer’s fixed point theorem and Banach contraction principle are undoubtedly the most important and applicable fixed point theorems. Many authors are dedicated to the generalization of the various directions of well-known fixed point theorems. The rapid development of fixed point theory and its applications has led to many academic papers studying the importance of its promotions and applications in nonlinear analysis, optimization problems, integral and differential equations and inclusions, dynamic system theory, control theory, signal and image processing, economics, game theory, etc. In this special issue, we will accept important research and development on fixed point theory that integrate basic science into the real world.

A plenty of problems caused by the real world can be reduced to solve mathematical models by applying computational analysis. During the previous more than seven decades, computational analysis has made more important contributions to improve our understanding of the real world around us in various fields, such as immunological systems, computational systems, electrical and mechanical structures, financial markets, information and knowledge management, highway transportation networks, telecommunication networks, economics and so on. Due to the significance of the applications of computational analysis, in this special issue, we would like to receive contributions describing applications of mathematics and computation.

We cordially and earnestly invite researchers to contribute their original and high quality research papers which will inspire the advance in fixed point theory, computational analysis and their applications. Potential topics include, but are not limited to:

• Fixed point theory and best proximity point theory with applications
• Numerical algorithms for nonlinear problems
• Variational method and its applications
• Nonlinear differential and integral equations by fixed point theory
• Optimization problems by fixed point theory
• Geometry of Banach spaces
• Well-posedness and control in fixed point theory and computational analysis
• Linear and nonlinear dynamical systems
• Image and signal processing
• Matrix theory
• Numerical analysis
• Computational geometry
• Computer graphics
• Finite element method
• Intelligence computation
• Scientific and engineering computing

Prof. Dr. Wei-Shih Du
Prof. Dr. Alicia Cordero
Prof. Dr. Huaping Huang
Prof. Dr. Juan R. Torregrosa
Guest Editors

Manuscript Submission Information

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• Fixed point theory
• Best proximity point theory
• Optimization problems
• Algorithms
• Variational inequality problems
• Geometry of Banach spaces
• Dynamical systems
• Matrix theory
• Numerical Analysis
• Image and signal processing
• Visualization