Recently, Küchler and Mensch [Stochastics Stochastics Rep. 40, 23 (1992)] derived exact stationary probability densities for linear stochastic delay differential equations. This paper presents an alternative derivation of these solutions by means of the Fokker-Planck approach introduced by Guillouzic [Phys. Rev. E 59, 3970 (1999); 61, 4906 (2000)]. Applications of this approach, which is argued to have greater generality, are discussed in the context of stochastic models for population growth and tracking movements
The primary aim of this thesis has been to study examples of the application of delay differential e...
To avoid finding the stationary distributions of stochastic differential equations by solving the no...
The response of a dynamical system modelled by differential equations with white noise as the forcin...
ISBN 978-960-6766-32-9This paper investigates the stochastic linear and logistic (Verhulst, Gompertz...
Models written in terms of stochastic delay differential equations (SDDE's) have recently appeared i...
This dissertation discusses the construction of some stochastic models for population dynamics with ...
AbstractA procedure reported elsewhere for solution of linear and nonlinear, deterministic or stocha...
The population growth of a single species is modeled by a differential equation with initial conditi...
In this paper, we use variation of constants formula to investigate the stationary distribution for ...
AbstractIn this paper we stochastically perturb the delay Lotka–Volterra model x˙(t)=diag(x1(t),…,xn...
We consider stochastic logistic type delayed growth model (Verhulst, Gompertz, Richards) of a single...
This paper examines the asymptotic behaviour of the stochastic extension of a fundamentally importa...
An Introduction to Stochastic Processes with Applications to Biology, Second Edition presents the ba...
We discuss the probabilistic properties of a class of differential delay equations (DDE's) by first ...
Abstract. We discuss how distributed delays arise in biological models and review the literature on ...
The primary aim of this thesis has been to study examples of the application of delay differential e...
To avoid finding the stationary distributions of stochastic differential equations by solving the no...
The response of a dynamical system modelled by differential equations with white noise as the forcin...
ISBN 978-960-6766-32-9This paper investigates the stochastic linear and logistic (Verhulst, Gompertz...
Models written in terms of stochastic delay differential equations (SDDE's) have recently appeared i...
This dissertation discusses the construction of some stochastic models for population dynamics with ...
AbstractA procedure reported elsewhere for solution of linear and nonlinear, deterministic or stocha...
The population growth of a single species is modeled by a differential equation with initial conditi...
In this paper, we use variation of constants formula to investigate the stationary distribution for ...
AbstractIn this paper we stochastically perturb the delay Lotka–Volterra model x˙(t)=diag(x1(t),…,xn...
We consider stochastic logistic type delayed growth model (Verhulst, Gompertz, Richards) of a single...
This paper examines the asymptotic behaviour of the stochastic extension of a fundamentally importa...
An Introduction to Stochastic Processes with Applications to Biology, Second Edition presents the ba...
We discuss the probabilistic properties of a class of differential delay equations (DDE's) by first ...
Abstract. We discuss how distributed delays arise in biological models and review the literature on ...
The primary aim of this thesis has been to study examples of the application of delay differential e...
To avoid finding the stationary distributions of stochastic differential equations by solving the no...
The response of a dynamical system modelled by differential equations with white noise as the forcin...