**Editors-in-Chief:**

**Shusen Ding**, Seattle University, United States of America

*Inequalities, Analysis, Partial Differential Equations*

**Árpád Baricz**, Babeş-Bolyai University, Romania and Óbuda University, Hungary

*Orthogonal polynomials and Special Functions; Geometric Function Theory; Classical and Complex Analysis*

**Song Wang**, Curtin University, Australia

*Numerical analysis, Variational inequalities, Optimal control & optimization, Computational finance*

**Editorial Board:**
**Samir Adly**, University of Limoges, France

*Variational Inequalities, Complementarity Problems, Non-smooth and Variational Analysis, Continuous Optimization, Non-smooth Dynamical Systems *

**Ivan Area**,** **University of Vigo, Spain

*Classical orthogonal polynomials, Multivariate orthogonal polynomials, Fractional calculus, Epidemiology Bioinformatics *

**Mircea Balaj**, University of Oradea, Romania

*KKM theory, Fixed point theory in topological vector spaces, Equilibium and quasi-equilibrium problems, Variational inequalities, Variational relation problems*

**Gejun Bao**, Harbin Institute of Technology, China

Lp theory in differential form; Nonlinear elliptic equations; Geometric theory of simple complex variable

**Martin Bohner**, Missouri University of Science and Technology, United States of America

*Ordinary differential equations, difference equations, dynamic equations on time scales, inequalities, boundary value problems, applications in biology and economics*

**Lixin Cheng,** Xiamen University, China

*Functional Analysis, Convex Analysis, Nonlinear geometry of Banach spaces, Theory of Measures of non-compactness *

**Jewgeni Dshalalow**, Florida Institute of Technology, United States of America

*Probability/Stochastic Processes, Real Analysis, Measure Theory, including Random Measures *

**Hemen Dutta**, Gauhati University, India

*Nonlinear analysis, Functional equation, Summability *

**Matthias Ehrhardt**, Bergische University-Wuppertal, Germany

*N**umerical Solution of Partial Differential Equations, Artificial Boundary Conditions, Computational Finance, Computational Acoustics, Numerical Solution of Schrödinger-type Equations *

**Allal Guessab***, *University of Pau, France

*A**pproximation Theory, Numerical Integration, Theory of Convex Functions, Theory of Mathematical Inequalities, Multivariate Approximation, Numerical Solution of PDEs, Numerical Optimization Theoretical and Practical Aspects*

**Min He**, Kent State University-Trumbull, United States of America

*Semigroup theory and dynamical systems dependent on parameters, Differential equations and integral equations and their applications, Qualitative theory of differential equations and dynamical systems, Stability and periodic solutions of ordinary and functional differential equations *

**Jong Kyu Kim**, Kyungnam University, Republic of Korea

*Numerical Analysis, Nonlinear Analysis, Topology, Mathematical Analysis, Applied Mathematics, Functional Analysis, Algorithms*

**Fuad Kittaneh**, University of Jordan, Jordan

*Functional Analysis, Matrix Analysis, Operator Theory*

**Vy Khoi Le**, Missouri University of Science and Technology, United States of America

*Analysis of variational inequalities and differential inclusions, Non-smooth Analysis, Nonlinear Analysis*

**Giuseppe Marino**, University of Calabria, Italy

*Fixed Points, Functional Analysis*

**Alexander Meskhi**, A. Razmadze Mathematical Institute, Georgia

*Harmonic Analysis, Function Spaces, Weight Theory of Integral Operators *

**M. Mursaleen***, *Aligarh Muslim University, India

*Functional Analysis; Sequence, Series and Summability, Functional Equations, Fixed Point Theory, Approximation Theory *

**Josip Pečarić**, University of Zagreb, Croatia

*Inequalities in Real analysis, Convex functions and their generalizations, Operator convex functions and related inequalities, Inequalities in Information theory*

**Tibor K. Pog****á****ny,** University of Rijeka, Croatia

*Special functions and applications, Functional series of Neumann, Kapteyn, Schlömilch, Dini and Mathieu type, Sampling theory of stochastic processes, Analytic inequalities of Hilbert type*

**Saminathan Ponnusamy**, Indian Institute of Technology Madras, India

*Geometric Function Theory, Function Spaces, Special Functions and Inequalities *

**Feng Qi***, *Henan Polytechnic University, China

*Special Functions, Analytic Combinatorics, Analytic Number Theory, Mathematical Means, Mathematical Inequalities. *

**John Ryan**, University of Arkansas, United States of America

*Dirac operators, conformally invariant ode and higher spin Laplacians*

**Samir H. Saker***, *Mansoura University, Egypt

*Discrete and continuous inequalities of Hardy’s type, Opial's type, Wirtinger, Dynamic inequalities on time scales, Fractional inequalities, Applications of inequalities in Harmonic Analysis*, * Discrete Muckenhoput and Gehring classes *

**Hari M. Srivastava**, University of Victoria, Canada

*Real and Complex Analysis, Fractional Calculus and Its Applications, Integral Equations and Transforms *

**Stevo Stević**, Mathematical Institute of the Serbian Academy of Sciences, Serbia

*Fixed Point Theory, Operator Theory, Difference Equations, Differential Equations, Complex Analysis *

**Soo Hak Sung**, Pai Chai University, Korea

*Probability Theory, Statistics *

**Kok Lay Teo**, Sunway University, Malaysia

*Optimal Control Computation, Numerical Optimization; Engineering and Management Applications of Optimal Control and Optimization. *

**Yong Hong Wu**, Curtin University, Australia

*Applied Mathematics, Computational Mathematics, Differential equations, Non-linear analysis *

**Yuming Xing**, Harbin Institute of Technology, China

*Harmonic analysis, Real analysis and complex analysis*

**Jen-Chih Yao**, Kaohsiung Medical University, Taiwan

*Vector optimization, Fixed point theory, Variational inequalities, Complementarity problems, Equilibrium problems, Optimal control, Generalized convexity and generalized monotonicity*

**Alexander Zaslavski**, Israel Institute of Technology, Israel

*Optimization, Nonlinear Analysis*

**Kai Zhang**, Shenzhen University, China

*variational inequalities, Hamilton-Jacobi-Bellman equations, and their application*