Identification and comparison of nonlinear dynamical system models using noisy and sparse experimental data is a vital task in many fields, however current meth-ods are computationally expensive and prone to error due in part to the nonlinear nature of the likelihood surfaces induced. We present an accelerated sampling procedure which enables Bayesian inference of parameters in nonlinear ordinary and delay differential equations via the novel use of Gaussian processes (GP). Our method involves GP regression over time-series data, and the resulting derivative and time delay estimates make parameter inference possible without solving the dynamical system explicitly, resulting in dramatic savings of computational time. We demonstrate the speed...
This paper introduces Gaussian Process Dynamical Models (GPDM) for nonlinear time series analysis. A...
State-space models are successfully used in many areas of science, engineering and economics to mode...
Complex biological systems are often modelled using non-linear differential equations which provide ...
Identification and comparison of nonlinear dynamical system models using noisy and sparse experiment...
Approximate Bayesian computation (ABC) using a sequential Monte Carlo method provides a comprehensiv...
Parameter estimation for nonlinear dynamic system models, represented by ordinary differential equat...
Parameter inference in ordinary differential equations is an important problem in many applied scien...
Bayesian parameter estimation in coupled ordi-nary differential equations (ODEs) is challeng-ing due...
We formulate probabilistic numerical approximations to solutions of ordinary differential equations ...
Gaussian process prior models are known to be a powerful non-parametric tool for stochastic data mod...
Gaussian processes provide an approach to nonparametric modelling which allows a straightforward com...
The analysis of time series data is important in fields as disparate as the social sciences, biology...
A Bayesian inference technique, able to encompass stochastic nonlinear systems, is described. It is ...
Dynamic processes are crucial in many empirical fields, such as in oceanography, climate science, an...
Linear systems occur throughout engineering and the sciences, most notably as differential equations...
This paper introduces Gaussian Process Dynamical Models (GPDM) for nonlinear time series analysis. A...
State-space models are successfully used in many areas of science, engineering and economics to mode...
Complex biological systems are often modelled using non-linear differential equations which provide ...
Identification and comparison of nonlinear dynamical system models using noisy and sparse experiment...
Approximate Bayesian computation (ABC) using a sequential Monte Carlo method provides a comprehensiv...
Parameter estimation for nonlinear dynamic system models, represented by ordinary differential equat...
Parameter inference in ordinary differential equations is an important problem in many applied scien...
Bayesian parameter estimation in coupled ordi-nary differential equations (ODEs) is challeng-ing due...
We formulate probabilistic numerical approximations to solutions of ordinary differential equations ...
Gaussian process prior models are known to be a powerful non-parametric tool for stochastic data mod...
Gaussian processes provide an approach to nonparametric modelling which allows a straightforward com...
The analysis of time series data is important in fields as disparate as the social sciences, biology...
A Bayesian inference technique, able to encompass stochastic nonlinear systems, is described. It is ...
Dynamic processes are crucial in many empirical fields, such as in oceanography, climate science, an...
Linear systems occur throughout engineering and the sciences, most notably as differential equations...
This paper introduces Gaussian Process Dynamical Models (GPDM) for nonlinear time series analysis. A...
State-space models are successfully used in many areas of science, engineering and economics to mode...
Complex biological systems are often modelled using non-linear differential equations which provide ...
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