Population dynamics models consisting of nonlinear difference equations allow us to get a better understanding of theprocesses involved in epidemiology. Usually, these mathematical models are studied under a deterministic approach.However, in order to take into account the uncertainties associated with the measurements of the model input param-eters, a more realistic approach would be to consider these inputs as random variables. In this paper, we study therandom time-discrete epidemiological models SIS, SIR, SIRS, and SEIR using a powerful unified approach basedupon the so-called adaptive generalized polynomial chaos (gPC) technique. The solution to these random differenceequations is a stochastic process in discrete time, which represents...
The basic reproduction number, simply denoted by $R_0$, plays a fundamental role in the analysis of ...
When applying models to patient-specific situations, the impact of model input uncertainty on the mo...
Generalized polynomial chaos (gPC) expansions allow us to represent the solution of a stochastic sys...
[EN] Population dynamics models consisting of nonlinear difference equations allow us to get a bette...
The use of epidemic modelling in connection with spread of diseases plays an important role in under...
[EN] In this paper, the application of adaptive generalized polynomial chaos (gPC) to quantify the u...
Mathematical models based on ordinary differential equations are a useful tool to study the processe...
This paper presents a methodology to quantify computationally the uncertainty in a class of differen...
Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, p...
In the context of uncertainty quantification, computational models are required to be repeatedly eva...
Time delay is ubiquitous in many real-world physical and biological systems. It typically gives rise...
Uncertainty quantification techniques based on the spectral approach have been studied extensively i...
In many fields, active research is currently focused on quantification and simulation of model uncer...
Abstract. In this paper we review some applications of generalized polynomial chaos expansion for un...
When applying models to patient-specific situations, the impact of model input uncertainty on the mo...
The basic reproduction number, simply denoted by $R_0$, plays a fundamental role in the analysis of ...
When applying models to patient-specific situations, the impact of model input uncertainty on the mo...
Generalized polynomial chaos (gPC) expansions allow us to represent the solution of a stochastic sys...
[EN] Population dynamics models consisting of nonlinear difference equations allow us to get a bette...
The use of epidemic modelling in connection with spread of diseases plays an important role in under...
[EN] In this paper, the application of adaptive generalized polynomial chaos (gPC) to quantify the u...
Mathematical models based on ordinary differential equations are a useful tool to study the processe...
This paper presents a methodology to quantify computationally the uncertainty in a class of differen...
Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, p...
In the context of uncertainty quantification, computational models are required to be repeatedly eva...
Time delay is ubiquitous in many real-world physical and biological systems. It typically gives rise...
Uncertainty quantification techniques based on the spectral approach have been studied extensively i...
In many fields, active research is currently focused on quantification and simulation of model uncer...
Abstract. In this paper we review some applications of generalized polynomial chaos expansion for un...
When applying models to patient-specific situations, the impact of model input uncertainty on the mo...
The basic reproduction number, simply denoted by $R_0$, plays a fundamental role in the analysis of ...
When applying models to patient-specific situations, the impact of model input uncertainty on the mo...
Generalized polynomial chaos (gPC) expansions allow us to represent the solution of a stochastic sys...