National and Kapodistrian University of Athens Sir Isaac Newton
Εάν μπόρεσα να δω πιο μακριά, είναι γιατί στεκόμουν πάνω σε ώμους γιγάντων.
If I have seen further it is by standing on the shoulders of giants. To R. Hook, February 1676.
Sir Isaac Newton, 1643-1727, English Mathematician

School of Economics and Political Science
Department of Economics
Division of Mathematics and Informatics

Research Interests:

  1. Random Matrix Theory

  2. Combinatorics

  3. Probability Theory

  4. Mathematical Control Theory

  5. Dynamical Systems

  6. Linear Algebra / Abstract Algebra / Computational Algebra

  7. Topological Data Analysis

  8. Computational mathematics with functional programming languages

Papers

In collected volumes
  1. (with J. Leventides) Diffusion on dynamical interbank loan networks, In: Discrete Mathematics and Applications, Springer, pp 339-367, 2020
    Bibtex information
    Author: Leventides J., Poulios N.
    Title: Diffusion on Dynamical Interbank Loan Networks.
    In: Raigorodskii A.M., Rassias M.T. (eds) Discrete Mathematics and Applications. Springer Optimization and Its Applications, vol 165. Springer, Cham.
    Date: 2020

In Journals
  1. (with N. Karcanias, J. Leventides) The notion of almost zeros and randomness, Institute of Mathematics and Its Applications (IMA) U.K., 2021
    Bibtex information
    Author: Leventides J., Karcanias N., Poulios N.
    Title: The notion of almost zeros and randomness
    In: IMA Journal of Mathematical Control and Information
    Date: 2021
  2. (with J. Leventides and C. Poulios) Random matrices and controllability of dynamical systems, Institute of Mathematics and Its Applications (IMA) U.K., 2021
    Bibtex information
    Author: Leventides John, Poulios Nick, Poulios Costas
    Title: Random matrices and controllability of dynamical systems
    In: IMA Journal of Mathematical Control and Information
    Date: 2021
  3. Control on dynamical networks, (working paper)
  4. Topological data analysis in brain disease, (working paper)
Double-Pendulum

Motion of the double compound pendulum (from numerical integration of the equations of motion). Source: Wikipedia.org