New Advances in Functional Analysis
A special issue of Mathematics (ISSN 2227-7390). This special issue belongs to the section "Computational and Applied Mathematics".
Deadline for manuscript submissions: closed (26 August 2022) | Viewed by 10285
Special Issue Editors
Interests: functional analysis; fixed point theory; applied convex analysis; nonlinear approximation theory in Banach space; variational inequalities; approximate solutions; general topology; applied nonlinear analysis
Special Issues, Collections and Topics in MDPI journals
Interests: fixed point theory; theory and algorithms on variational inequalities; set-valued and variational analysis; nonlinear analysis; optimization; well-posedness and optimal control
Special Issues, Collections and Topics in MDPI journals
Special Issue Information
Dear Colleagues,
Nowadays, functional analysis is a very important research field. In particular, as its branch, nonlinear functional analysis has played a crucial role in the exploration of various nonlinear phenomena in the real world. Results on solvability and numerical calculation solutions to the fixed-point equations of nonlinear operators exhibit the extraordinary versatility for applications in pure and applied sciences.
Nonlinear optimization also exhibits an extraordinary role in the exploration of some features that explain various nonlinear phenomena in the real world, such as efficiency, control, etc. Its research topics cover best approximation, numerical computation, efficiency solutions, well-posedness and so forth.
The objective of this Special Issue is to report new results in the two research areas as above: nonlinear functional analysis and optimization, and their applications. This Special Issue will accept high-quality papers including original research results, with illustrative applications, and survey articles of exceptional merit.
Prof. Dr. Luchuang Ceng
Prof. Dr. Ching-Feng Wen
Guest Editors
Manuscript Submission Information
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Keywords
- Solvability of fixed-point equations of nonlinear operators
- Best approximation problems in Banach spaces
- Iterative procedures for fixed points or best proximity points
- Nonlinear optimization and applications
- Variational inclusions and equilibrium problems
- Existence and optimality conditions
- Dynamical systems and special functions
- Well-posedness and optimal control
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