We explore probability modelling of discretization uncertainty for system states defined implicitly by ordinary or partial differential equations. Accounting for this uncertainty can avoid posterior under-coverage when likelihoods are constructed from a coarsely discretized approximation to system equations. A formalism is proposed for inferring a fixed but a priori unknown model trajectory through Bayesian updating of a prior process conditional on model information. A one-step-ahead sampling scheme for interrogating the model is described, its consistency and first order convergence properties are proved, and its computational complexity is shown to be proportional to that of numerical explicit one-step solvers. Examples illustrate the fl...
We describe a Bayesian methodology for fitting deterministic dynamic models, demonstrating how this ...
Models defined by stochastic differential equations (SDEs) allow for the representation of random va...
Biological processes are often modelled using ordinary differential equations. The unknown parameter...
We explore probability modelling of discretization uncertainty for system states defined implicitly ...
This paper advocates expansion of the role of Bayesian statistical inference when formally quantifyi...
AbstractNonlinear dynamic systems such as biochemical pathways can be represented in abstract form u...
Nonlinear dynamic systems such as biochemical pathways can be represented in abstract form using a n...
Equation learning aims to infer differential equation models from data. While a number of studies ha...
The behaviour of many processes in science and engineering can be accurately described by dynamical ...
We begin by introducing the main ideas of the paper, and we give a brief description of the method p...
The numerical solution of differential equations can be formulated as an inference problem to which ...
In this paper, we present a formal quantification of uncertainty induced by numerical solutions of o...
In this paper, we present a formal quantification of uncertainty induced by numerical solutions of o...
In this paper, we present a formal quantification of epistemic uncertainty induced by numerical solu...
This paper is concerned with the characterization and the propagation of errors associated with data...
We describe a Bayesian methodology for fitting deterministic dynamic models, demonstrating how this ...
Models defined by stochastic differential equations (SDEs) allow for the representation of random va...
Biological processes are often modelled using ordinary differential equations. The unknown parameter...
We explore probability modelling of discretization uncertainty for system states defined implicitly ...
This paper advocates expansion of the role of Bayesian statistical inference when formally quantifyi...
AbstractNonlinear dynamic systems such as biochemical pathways can be represented in abstract form u...
Nonlinear dynamic systems such as biochemical pathways can be represented in abstract form using a n...
Equation learning aims to infer differential equation models from data. While a number of studies ha...
The behaviour of many processes in science and engineering can be accurately described by dynamical ...
We begin by introducing the main ideas of the paper, and we give a brief description of the method p...
The numerical solution of differential equations can be formulated as an inference problem to which ...
In this paper, we present a formal quantification of uncertainty induced by numerical solutions of o...
In this paper, we present a formal quantification of uncertainty induced by numerical solutions of o...
In this paper, we present a formal quantification of epistemic uncertainty induced by numerical solu...
This paper is concerned with the characterization and the propagation of errors associated with data...
We describe a Bayesian methodology for fitting deterministic dynamic models, demonstrating how this ...
Models defined by stochastic differential equations (SDEs) allow for the representation of random va...
Biological processes are often modelled using ordinary differential equations. The unknown parameter...