# Shape Analysis, Stochastic Geometric Mechanics and Applied Optimal Transport

## Videos from BIRS Workshop 18w5151

, University of Toronto
- 09:43
Beyond Arnold’s geodesic framework of an ideal hydrodynamics
, University of Notre Dame
- 10:22
The $L^2$ exponential map in 2D and 3D hydrodynamics
, Chalmers University of Technology / University of Gothenburg
- 11:30
Semi-invariant metrics on diffeos
, University of Lisbon
- 15:00
On some relations between Optimal Transport and Stochastic Geometric Mechanics
, Universite Paris Nanterre
- 15:58
, Université de Bordeaux
- 16:35
A duality formula and a particle Gibbs sampler for continuous time Feynman-Kac measures on path spaces
, Imperial College London
- 17:26
Geometric modelling of uncertainties
, University of Münster
- 09:38
Semi-discrete unbalanced optimal transport and quantization
, University of Cambridge
- 10:22
Wasserstein for learning image regularisers
, University of California, Irvine
- 11:32
Interpolation of Gaussian mixture models and other directions in Optimal Mass Transport
, John Hopkins University
- 12:20
Normal coordinates and equivolumic layers estimation in the cortex (tentative)
, Université Pierre-et-Marie-Curie
- 17:12
Analyze shape variability via deformations
, University of Ottawa
- 17:56
Convnets, a different view of approximating diffeomorphisms in medical image registration
, Brooklyn College
- 09:40
Solar models for Euler-Arnold equations
, University of Toronto
- 10:15
Vanishing geodesic distance for right-invariant Sobolev metrics on diffeomorphism groups
, University of Freiburg
- 11:26
Smooth perturbations of the functional calculus and applications to Riemannian geometry on spaces of metrics
, Florida State University
- 12:12
Comparing Shapes of Curves, Surfaces, and Higher Dimensional Immersions in Euclidean Space
, The Ohio State University
- 09:44
Metrics on the collection of dynamic shapes
, Ohio State University
- 10:37
Gromov-Monge Quasimetrics and Distance Distributions
, INRIA Rocquencourt
- 11:27
Dynamic formulations of optimal transportation and variational relaxation of Euler equations.
, Shanghai Jiao Tong University
- 12:10
Group valued momentum maps