Stability is a desirable characteristic for linear dynamical systems, but it is often ignored by algorithms that learn these systems from data. We propose a novel method for learning stable linear dynamical systems: we formulate an approximation of the problem as a convex program, start with a solution to a relaxed version of the program, and incrementally add constraints to improve stability. Rather than continuing to generate constraints until we reach a feasible solution, we test stability at each step; because the convex program is only an approximation of the desired problem, this early stopping rule can yield a higher-quality solution. We apply our algorithm to the task of learning dynamic textures from image sequences as well as to m...
Learning stable dynamics from observed time-series data is an essential problem in robotics, physica...
We consider the linear quadratic regulation problem when the plant is an unknown linear dynamical sy...
In this paper, we present a new approach for finding a stable solution of a system of nonlinear equa...
1 Introduction Many problems in machine learning involve sequences of real-valued multivariate obser...
We propose a principled method for projecting an arbitrary square matrix to the non-convex set of as...
The aim of the paper is to show that linear dynamical systems can be quite useful when dealing with ...
© The Author(s) 2020. We propose a novel framework for learning stabilizable nonlinear dynamical sys...
This thesis concerns the scalable application of convex optimization to data-driven modeling of dyna...
We propose a novel framework for learning stabilizable nonlinear dynamical systems for continuous co...
Stability is a crucial property in the study of dynamical systems. We focus on the problem of enforc...
In this paper, we consider the identification of linear systems, a priori known to be stable, from i...
In this paper, we consider the identification of linear systems, a priori known to be stable, from ...
This paper introduces new techniques for using convex optimization to fit input-output data to a cla...
This work presents a data-driven method for approximation of the maximum positively invariant (MPI) ...
International audienceThis paper concerns the simulation of a class of nonlinear discrete-time syste...
Learning stable dynamics from observed time-series data is an essential problem in robotics, physica...
We consider the linear quadratic regulation problem when the plant is an unknown linear dynamical sy...
In this paper, we present a new approach for finding a stable solution of a system of nonlinear equa...
1 Introduction Many problems in machine learning involve sequences of real-valued multivariate obser...
We propose a principled method for projecting an arbitrary square matrix to the non-convex set of as...
The aim of the paper is to show that linear dynamical systems can be quite useful when dealing with ...
© The Author(s) 2020. We propose a novel framework for learning stabilizable nonlinear dynamical sys...
This thesis concerns the scalable application of convex optimization to data-driven modeling of dyna...
We propose a novel framework for learning stabilizable nonlinear dynamical systems for continuous co...
Stability is a crucial property in the study of dynamical systems. We focus on the problem of enforc...
In this paper, we consider the identification of linear systems, a priori known to be stable, from i...
In this paper, we consider the identification of linear systems, a priori known to be stable, from ...
This paper introduces new techniques for using convex optimization to fit input-output data to a cla...
This work presents a data-driven method for approximation of the maximum positively invariant (MPI) ...
International audienceThis paper concerns the simulation of a class of nonlinear discrete-time syste...
Learning stable dynamics from observed time-series data is an essential problem in robotics, physica...
We consider the linear quadratic regulation problem when the plant is an unknown linear dynamical sy...
In this paper, we present a new approach for finding a stable solution of a system of nonlinear equa...