• Dalhousie-AARMS AAMP Seminar: Marco Merkli (MUN)

    Zoom seminar

    The Dalhousie-AARMS Analysis-Applied Math-Physics Seminar takes place on Fridays from 4 - 5 pm Atlantic Time over Zoom.  If you would like to attend, please email the organizers for connection details.

  • Dalhousie-AARMS AAMP Seminar: Ben Landon (University of Toronto)

    Zoom seminar

    Title: Local eigenvalue statistics of random matrices and Dyson Brownian motion Abstract:  Dyson Brownian motion is a stochastic process describing eigenvalue dynamics under a matrix-valued Brownian motion.  We will review this process and its role in the study of universality

  • Dalhousie-AARMS AAMP Seminar: Perry Kleinhenz (Michigan State University)

    Zoom seminar

    Title: Stabilization rates for the damped wave equation with polynomial and oscillatory damping Abstract: In this talk I will discuss energy decay of solutions of the Damped wave equation. After giving an overview of classical results I'll focus on the

  • Dalhousie-AARMS AAMP Seminar: Amanda Young (Technical University of Munich)

    Zoom seminar

    Title: A bulk gap in the presence of edge states for a HaldanepseudopotentialAbstract: In this talk, we discuss a recent result on a bulk gap for atruncated Haldane pseudopotential with maximal half filling, whichdescribes a strongly correlated system of spinless

  • Dalhousie-AARMS AAMP Seminar: Jesse Gell-Redman (University of Melbourne)

    Zoom seminar

    Title: A Fredholm approach to scattering Abstract: We will give a friendly introduction to the scattering theory, specifically to the matrix for Schrodinger operators.  We will then discuss how a new functional analytic approach to analysis of non-elliptic equations, due to

  • Dalhousie-AARMS AAMP Seminar: Cyril Letrouit (École Normale Supérieure)

    Zoom seminar

    Title - Propagation of singularities in subelliptic PDEs Abstract - In this talk, we consider the wave equation where the Laplacian is replaced by a sub-Laplacian (also called ``Hörmander sum of square''), which is an hypoelliptic operator. We handle the