MAThS

Faculty Members

1. Betsakos Dimitrios

2. Fotiadis Anestis

3. Galanopoulos Petros

4. Koutsogiannis Andreas

5. Malikiosis Romanos-Diogenis

6. Ntalampekos Dimitrios

7. Sakellaris Georgios

Postdocs

1. Christodoulou Argyrios 

2. Lee Sungjin

3. Zarvalis Konstantinos

PhD Students

1. Angelidou Mary

2. Papadimitriou Christos

3. Poursalidis Nikos

4. Simichanidis Alexandros

5. Stavropoulos Sokratis
   
   

• 26-11-2025: Dimitrios Ntalampekos (Aristotle University of Thessaloniki)

Date: Wednesday 26-11-2025, 11:00am in room M2

Title: Uniformization problems in the plane

Abstract: According to the classical uniformization theorem of Koebe and Poincaré, every smooth surface with the topology of a two-dimensional sphere can be conformally transformed to the unit sphere. Uniformization problems in the complex plane concern the transformation of a set to a canonical set with a map that preserves the geometry and distorts shapes in a controlled fashion. One such problem is Koebe's conjecture, which remains open for 120 years and predicts that each domain in the plane can be conformally transformed to a circle domain. We will present the history of the conjecture, recent developments, the uniqueness problem, and variants of the conjecture with applications in dynamical systems. 

• 20-11-2025: Carlo Bellavita  (Dipartimento di Matematica, Università degli Studi di Milano)

Date: Thursday 20-11-2025, 11:00am in room M2

Title: Boundedness, compactness and Schatten class for Rhaly matrices

• 05-11-2025: Mihalis Kolountzakis (University of Crete)

Date: Wednesday 05-11-2025, 12:00pm in room M2

Title: Bounded common fundamental domains for two lattices

Abstract: We prove that for any two lattices  $L, M \subseteq \RR^d$ of the same volume there exists a measurable, bounded, common fundamental domain of them. In other words, there exists a bounded measurable set $E \subseteq \RR^d$ such that $E$ tiles $\RR^d$ when translated by $L$ or by $M$. A consequence of this is that the indicator function of $E$ forms a Weyl--Heisenberg (Gabor) orthogonal basis of $L^2(\RR^d)$ when translated by $L$ and modulated by $M^*$, the dual lattice of $M$.

• 24-09-2025: Andreu Ferré-Moragues (Universidad Complutense de Madrid)
  
  Date: Wednesday 24-09-2025, 10:00am in room M2
  
  Title: Ergodic Ramsey Theory and partition regularity of Pythagorean pairs
  
  Abstract: In this talk we will explore how the analytical tools afforded by Ergodic Theory can be leveraged to tackle problems in Combinatorics; more particularly, Ramsey Theory. After a brief introduction to the main ideas of these topics, we will jump into the problem that will be our focus: partition regularity of Pythagorean pairs. We will understand how the problem was dealt with in previous works of Frantzikinakis, Klurman, and Moreira and discuss an extension to the Gaussian integers. This last bit is part of an ongoing joint project with Sebastián Donoso, Andreas Koutsogiannis and Wenbo Sun.