We address the problem of performing decision tasks and, in particular, classification and recognition in the space of dynamical models in order to compare time series of data. Motivated by the application of recognition of human motion in image sequences, we consider a class of models that include linear dynamics, both stable and marginally stable (periodic), both minimum and nonminimum phases, driven by non-Gaussian processes. This requires extending existing learning and system identification algorithms to handle periodic modes and nonminimum-phase behavior while taking into account higher order statistics of the data. Once a model is identified, we define a kernel-based cord distance between models, which includes their dynamics, their ...
Standard, exact techniques based on likelihood maximization are available for learning Auto-Regressi...
The problem of optimal approximate system identification is addressed with a newly defined measure o...
Given a time series arising as the observations of some dynamical system, it is possible to reconstr...
We propose a family of kernels based on the Binet-Cauchy theorem, and its extension to Fredholm oper...
We analyze non-linear, non-Gaussian temporal chain models (dynamical systems) having continuous hidd...
This paper introduces Gaussian Process Dynamical Models (GPDM) for nonlinear time series analysis. A...
International audienceA new approach for motion characterization in image sequences is presented. It...
We consider the question of predicting nonlinear time series. Kernel Dynamical Modeling, a new meth...
The goal of this work is to learn a parsimonious and informative representation for high-dimensional...
The problem of optimal approximate system identification is addressed with a newly defined measure o...
This paper introduces Gaussian Process Dynamical Models (GPDM) for nonlinear time series analysis. A...
In some recent works, an alternative nonparamet- ric paradigm to linear model identification has bee...
Dynamical systems are used to model physical phenomena whose state changes over time. This paper pro...
International audienceSensors and systems often exhibit different dynamics in response to various st...
This thesis focuses on inference problems involving stochastic dynamics in biological systems. Many ...
Standard, exact techniques based on likelihood maximization are available for learning Auto-Regressi...
The problem of optimal approximate system identification is addressed with a newly defined measure o...
Given a time series arising as the observations of some dynamical system, it is possible to reconstr...
We propose a family of kernels based on the Binet-Cauchy theorem, and its extension to Fredholm oper...
We analyze non-linear, non-Gaussian temporal chain models (dynamical systems) having continuous hidd...
This paper introduces Gaussian Process Dynamical Models (GPDM) for nonlinear time series analysis. A...
International audienceA new approach for motion characterization in image sequences is presented. It...
We consider the question of predicting nonlinear time series. Kernel Dynamical Modeling, a new meth...
The goal of this work is to learn a parsimonious and informative representation for high-dimensional...
The problem of optimal approximate system identification is addressed with a newly defined measure o...
This paper introduces Gaussian Process Dynamical Models (GPDM) for nonlinear time series analysis. A...
In some recent works, an alternative nonparamet- ric paradigm to linear model identification has bee...
Dynamical systems are used to model physical phenomena whose state changes over time. This paper pro...
International audienceSensors and systems often exhibit different dynamics in response to various st...
This thesis focuses on inference problems involving stochastic dynamics in biological systems. Many ...
Standard, exact techniques based on likelihood maximization are available for learning Auto-Regressi...
The problem of optimal approximate system identification is addressed with a newly defined measure o...
Given a time series arising as the observations of some dynamical system, it is possible to reconstr...