Optimal transport began as the problem to efficiently redistribute goods between production and consumers, and evolved into a far reaching geo- metric variational framework for studying flows of distributions on metric spaces. This theory interests in enabling ways a class of stochastic control problems, to regulate dynamical systems so as to limit uncertainty to within specifications. Representative control examples include the landing of a spacecraft aimed probabilistically towards a target, and the suppression of undesirable effects of thermal noise on resonators; in either, the goal is to regulate the flow of the distribution of the random state. Thence, a most unlikely link turned up between transport of probability distributions and a...
Optimal transport is now a standard tool for solving many problems in statistics and machine learnin...
Entropic regularization of optimal transport is appealing both from a numerical and theoretical pers...
The subject of this work has its roots in the so-called Schrödginer bridge problem (SBP) which asks ...
Optimal transport began as the problem to efficiently redistribute goods between production and cons...
We take a new look at the relation between the optimal transport problem and the Schrödinger bridge ...
In 1931-1932, Erwin Schrödinger studied a hot gas Gedankenexperiment (an instance of large deviation...
University of Minnesota Ph.D. dissertation. May 2016. Major: Mechanical Engineering. Advisor: Trypho...
In this paper, we consider a discrete-time stochastic control problem with uncertain initial and tar...
We consider the problem of steering a linear dynamical system with complete state observation from a...
Optimal transport is a powerful tool for proving entropy-entropy production inequalities related to ...
We consider the problem of steering an initial probability density for the state vector of a linear ...
Optimal Transport (OT) has recently gained increasing attention in various fields ranging from biolo...
A Fokker-Planck framework for the formulation of an optimal control strategy of stochastic process...
We solve optimal transportation problem using stochastic optimal control theory. Indeed, for a super...
Abstract — This paper presents a unified view of stochastic optimal control theory as developed with...
Optimal transport is now a standard tool for solving many problems in statistics and machine learnin...
Entropic regularization of optimal transport is appealing both from a numerical and theoretical pers...
The subject of this work has its roots in the so-called Schrödginer bridge problem (SBP) which asks ...
Optimal transport began as the problem to efficiently redistribute goods between production and cons...
We take a new look at the relation between the optimal transport problem and the Schrödinger bridge ...
In 1931-1932, Erwin Schrödinger studied a hot gas Gedankenexperiment (an instance of large deviation...
University of Minnesota Ph.D. dissertation. May 2016. Major: Mechanical Engineering. Advisor: Trypho...
In this paper, we consider a discrete-time stochastic control problem with uncertain initial and tar...
We consider the problem of steering a linear dynamical system with complete state observation from a...
Optimal transport is a powerful tool for proving entropy-entropy production inequalities related to ...
We consider the problem of steering an initial probability density for the state vector of a linear ...
Optimal Transport (OT) has recently gained increasing attention in various fields ranging from biolo...
A Fokker-Planck framework for the formulation of an optimal control strategy of stochastic process...
We solve optimal transportation problem using stochastic optimal control theory. Indeed, for a super...
Abstract — This paper presents a unified view of stochastic optimal control theory as developed with...
Optimal transport is now a standard tool for solving many problems in statistics and machine learnin...
Entropic regularization of optimal transport is appealing both from a numerical and theoretical pers...
The subject of this work has its roots in the so-called Schrödginer bridge problem (SBP) which asks ...