This seminar relates to all areas in pure and applied mathematics which have relation to Nonlinear Analysis and Optimization.
Topics: Nonlinear Functional Analysis, Fixed Point Theory and Approximations, Proximal-Point Algorithms, Nonlinear Differential Equations and Dynamical Systems, Fractional and Partial Differential Equations, Convex and Non-convex Analysis, Set-Valued Analysis, Equilibrium Problems, Harmonic Analysis, Evolution Equations, Geometry of Banach Spaces, Numerical Analysis, Wavelet and Frames, Optimization Theory, Nonlinear Optimization, Global Optimization, Combinatorial Optimization, Dynamic Programming, Optimal Control Theory, Other Related Topics of Optimization Theory and Numerical Algorithms.