Da mecânica geométrica estocástica a problemas de transporte de massa
PTDC/MAT-STA/0975/2014
Investigadores
- Marc Arnaudon
- Giovanni Conforti
- Ana Bela Cruzeiro (PI)
- Diogo Gomes
- Rémi Lassalle
- Christian Léonard
- Davide Masoero
- Léonard Monsaingeon
- Carlos Oliveira
- Jean-Claude Zambrini
Doutorandos
- Guoping Liu
- Luigia Ripani
- Alexandra Symeonides
- Luca Tamanini
Descrição
This project will develop a stochastic perturbation of Geometric Mechanics (in finite and infinite dimensions), from different perspectives. Up to now the main approach has been motivated by ideas inspired by Statistical Mechanics. We advocate another method, inspired by the quantization of classical dynamical systems. This approach became recently interesting for a wide range of problems around optimal transport theory and our team is made up of some of the researchers who brought together the fields of Stochastic deformation and Optimal transport. Our methods will involve ideas of Geometric Mechanics, Stochastic Analysis, Stochastic Control Theory and entropy minimization techniques as well as some deterministic and geometric tools used in PDE's.
The host institution is the Group of Mathematical Physics of the University of Lisbon. This is a research centre in Mathematics funded by the Portuguese Science Foundation (FCT). The project includes funding for two postdoctoral positions starting before the end of 2017. For a description of the conditions, deadlines, etc, please see the call for applications for the first one.
Time span: 15/05/2016-14/05/2019
Workshop
From Stochastic Geometric Mechanics to Mass Transportation Problems.
Algumas publicações relevantes
- M. Arnaudon, X. Chen, A.B. Cruzeiro
- Stochastic Euler-Poincaré reduction
J. Math. Phys. 55, 081507 - C. Léonard
- A survey of the Schrödinger problem and some of its connections
with optimal transport
Discrete Cont. Dyn.Syst. A 34 (4), 1533-1574 - J.C. Zambrini
- Variational processes and stochastic versions of mechanics
J. Math. Phys. 27, 2307