Topics

Potential topics are:

  • Spectral theory
  • Approximation theory
  • Operator theory
  • Potential theory
  • Oscillation theory
  • Asymptotical Methods
  • Geometry of Banach spaces
  • Orthogonal series
  • Orthogonal polynomials
  • Summability
  • Statistical summability and statistical approximation
  • Sequence spaces and fuzzy sequence spaces
  • Topology
  • Topological properties of the matrix domains
  • Integral equations and integral transforms
  • Perturbation methods
  • Functional analysis
  • Harmonic analysis
  • Wavelet analysis
  • Numerical functional analysis and applications
  • Computational methods in partial differential equations
  • Scientific Computing
  • Problems involving operators with nonlocal boundary conditions
  • Equations of gas and hydrodynamics
  • Local and nonlocal boundary value problems for partial differential equations
  • Nonlinear stochastic processes and stochastic differential equations
  • Stochastic partial differential equations and applications
  • Impulsive and functional differential equations
  • Financial mathematics
  • Navier-Stokes problems
  • Ill-posed problems
  • Inverse problems
  • Reaction-Diffusion equations and systems
  • Fractional differential equations and applications
  • Mathematical and computer modelling
  • Modelling social and economic systems
  • Time neural networks and their stability
  • Dynamic equations on time scales
  • Oscillatory behaviour on time scales
  • Optimization