## 2018-19 Montreal Analysis Seminar

Seminars are usually held on Mondays or Fridays at Concordia,
McGill or Universite de Montreal

For suggestions, questions etc. please contact Dmitry Jakobson
(dmitry.jakobson@mcgill.ca), Iosif Polterovich
(iossif@dms.umontreal.ca) or
Alina Stancu (alina.stancu@concordia.ca)

## WINTER 2019

** Friday, March 29, McGill, time and room TBA
**

** Ilia Binder** (Toronto)

Title to be announced

** Friday, March 22, McGill, time and room TBA
**

** Mikhail Karpukhin** (Irvine)

Title to be announced

** Thursday, January 24, 14:00-15:00, Concordia, Room LB 921-4**

** Almut Burchard** (Toronto)

Title to be announced

## FALL 2018

** Friday, November 23, 13:30-14:30, McGill, Burnside
Hall, Room 1104**

** Herve Lombaert** (ETS Montreal/Inria Sophia-Antipolis)

Spectral Correspondence and Learning of Surface Data -
Example on Brain Surfaces

** Abstract:**
How to analyze complex shapes, such as of the highly folded surface of
the brain? In this talk, I will show how spectral representations of
shapes can benefit neuroimaging and, more generally, problems where data
fundamentally lives on surfaces. Key operations, such as segmentation and
registration, typically need a common mapping of surfaces, often obtained
via slow and complex mesh deformations in a Euclidean space. Here, we
exploit spectral coordinates derived from the Laplacian eigenfunctions of
shapes and also address the inherent instability of spectral shape
decompositions. Spectral coordinates have the advantage over Euclidean
coordinates, to be geometry aware and to parameterize surfaces explicitly.
This change of paradigm, from Euclidean to spectral representations,
enables a classifier to be applied directly on surface data,
via spectral coordinates.
The talk will focus, first, on spectral representations of shapes, with
an example on brain surface matching, and second, on the learning of
surface data, with an example on automatic brain surface parcellation.

** Friday, October 26, 14:00-15:00, McGill, Burnside Hall,
Room 1120 (note the new room!)**

** K. Luli** (UC Davis)

Variational Problems on Arbitrary Sets

** Abstract:**
Let E be an arbitrary subset of R^n. Given real valued functions f
defined on E and g defined on R^n, the classical Obstacle Problem asks
for a minimizer of the Dirichlet energy subject to the following two
constraints: (1) F = f on E and (2) F >= g on R^n. In this talk, we
will discuss how to use extension theory to construct (almost) solutions
directly. We will also explain several recent results that will help lay
the foundation for building a complete theory revolving around the belief
that any variational problems that can be solved using PDE theory can also
be dealt with using extension theory.

** Friday, October 19, 13:30-14:30, McGill, Burnside Hall,
Room 1104**

** Hans Christianson** (UNC Chapel Hill)

Quantum Ergodic properties for eigenfunctions on triangles

** Abstract:**
In this talk we will discuss one aspect of the idea of classical-quantum
correspondence in planar domains called quantum ergodicity. For a planar
domain, the classical problem is to imagine the domain is a billiard table,
while the quantum problem is to imagine it is a drum. Waves on a drum head
tend to follow along billiard trajectories, so if the billiard trajectories
are sufficiently chaotic, we expect the waves to spread out. This is
called quantum ergodicity. We will informally discuss some of the subtle
history of this topic, where detailed information about the billiard flow
is essential for the quantum problem. We will then move on to a very
unsubtle result which hints at quantum ergodicity for triangular domains
without using any dynamical systems information at all. This result
follows from a very short proof using nothing more than integrations by parts.

** Friday, October 5, 13:30-14:30, McGill, Burnside Hall, Room 1104**

** J. De Simoi** (Toronto)

On spectral rigidity for generic symmetric convex billiards

** Abstract:**
In this talk I will present a most recent result in the setting of length-
spectral rigidity for convex billiards. In a joint work with A. Figalli and
V. Kaloshin we show that there exists an open and dense set S of smooth convex
axially-symmetric planar domains so that every non-isometric deformation of
some D in S necessarily changes the length of a periodic orbit of the
billiard in D.

** Friday, September 21, 13:30-14:30, McGill, Burnside Hall, Room 1104**

** Javad Mashreghi** (Laval)

Polynomial approximation in super-harmonically weighted Dirichlet spaces

** Abstract:**
Taylor polynomials are natural objects for approximation in function spaces. Indeed, it works in several
function spaces, e.g., Hardy and Bergman spaces. However, it also fails in some cases and a remedy is needed, e.g.,
disc algebra and weighted Dirichlet spaces. We show that in the latter, Taylor polynomials may diverge. However,
by properly adjusting the last coefficient we produce a convergent sequence in local Dirichlet spaces. We also show
that in super-harmonically weighted Dirichlet spaces, Fejer averages provide a convergent sequence.
Joint work with T. Ransford.

** Monday, September 17, 13:30-14:30, McGill, Burnside Hall,
Room 1104**

** Matthew de Courcy-Ireland ** (Princeton)

Monochromatic waves at shrinking scales

** Abstract:**
We study an ensemble of random functions on a compact Riemannian manifold.
These random functions have been proposed by Berry as a model for
high-frequency Laplace eigenfunctions in chaotic settings. We prove that,
with high probability, they are evenly distributed in the mean square sense
on shrinking geodesic balls. The rate of shrinking comes within a
logarithmic factor of the optimal wave scale, and equidistribution occurs
simultaneously over all possible centers for the ball.

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