Abstract:  In this talk, we will start by explaining a classical random reinforcement model introduced by Pólya back in 1920 which […]

Abstract:  The discrete Cheeger inequality is a well-known inequality in spectral graph theory, which relates the second largest eigenvalue of the […]

Title:      AGM and jellyfish swarms of elliptic curves over finite fields Abstract:  The classical $\\AGM$ produces wonderful interdependent infinite sequences […]

Abstract: Congruences between modular forms have provided many interesting arithmetic properties e.g. the Ramanujan congruence. These congruences led Serre to […]

Abstract:  Computing dimension formulas for the spaces of Siegel modular forms of degree 2 is of great interest to many […]

Abstract:  The dimer model, also referred to as domino tilings or perfect matching, are tilings of the Z^d lattice by […]

Abstract:  In my talk, I will address several mathematical questions about the constrained Stochastic Partial Differential Equations (SPDEs) arising from […]

Abstract :  The deformation theory of modular forms is increasingly attracting many researchers in arithmetic geometry as it has been an […]

Title: On the nuances of electronic voting: towards public verifiability and recoverability. This series of seminars has been initiated to promote […]

Abstract:  Ramsey theory studies the paradigm that every sufficiently large system contains a well-structured subsystem. Within graph theory, this translates […]

Abstract:  Ramsey theory studies the paradigm that every sufficiently large system contains a well-structured subsystem. Within graph theory, this translates […]

Abstract:  Ramsey theory studies the paradigm that every sufficiently large system contains a well-structured subsystem. Within graph theory, this translates […]