Add to ORKGsummary:We study a numerical method for the diffusion of an age-structured population in a spatial environment. We extend the method proposed in [2] for linear diffusion problem, to the nonlinear case, where the diffusion coefficients depend on the total population. We integrate separately the age and time variables by finite differences and we discretize the space variable by finite elements. We provide stability and convergence results and we illustrate our approach with some numerical result
AbstractWe continue a population model with age dependence and spatial diffusion in the semigroup fr...
A semi-discretization method for solving an age-dependent population dynamics model with an addition...
AbstractA finite difference method for a system of hyperbolic partial differential-integral equation...
summary:We study a numerical method for the diffusion of an age-structured population in a spatial e...
Abstract. We consider a nonlinear model for age-dependent population dynamics subject to a density d...
We consider a nonlinear model for age-dependent population dynamics subject to a density dependent ...
AbstractA numerical method is proposed to approximate the solution of a nonlinear and nonlocal syste...
AbstractWe propose a procedure to approximate the solution of a degenerate parabolic equation descri...
We present results of the numerical investigation of the homogenous Dirichlet and Neumann problems t...
. A linear model for an age-structured population with random diffusion in a bounded domain \Omega ...
In this paper, it is considered for a class of stochastic age-structured population equations with d...
We are concerned with a population model with age-size dependence and spatial diffusion in the semig...
Abstract. In this work we present three age-structured models with spatial dependence. We introduce ...
AbstractA model of population growth is developed which allows for consideration of both age and spa...
AbstractWe continue a population model with age dependence and spatial diffusion in the semigroup fr...
AbstractWe continue a population model with age dependence and spatial diffusion in the semigroup fr...
A semi-discretization method for solving an age-dependent population dynamics model with an addition...
AbstractA finite difference method for a system of hyperbolic partial differential-integral equation...
summary:We study a numerical method for the diffusion of an age-structured population in a spatial e...
Abstract. We consider a nonlinear model for age-dependent population dynamics subject to a density d...
We consider a nonlinear model for age-dependent population dynamics subject to a density dependent ...
AbstractA numerical method is proposed to approximate the solution of a nonlinear and nonlocal syste...
AbstractWe propose a procedure to approximate the solution of a degenerate parabolic equation descri...
We present results of the numerical investigation of the homogenous Dirichlet and Neumann problems t...
. A linear model for an age-structured population with random diffusion in a bounded domain \Omega ...
In this paper, it is considered for a class of stochastic age-structured population equations with d...
We are concerned with a population model with age-size dependence and spatial diffusion in the semig...
Abstract. In this work we present three age-structured models with spatial dependence. We introduce ...
AbstractA model of population growth is developed which allows for consideration of both age and spa...
AbstractWe continue a population model with age dependence and spatial diffusion in the semigroup fr...
AbstractWe continue a population model with age dependence and spatial diffusion in the semigroup fr...
A semi-discretization method for solving an age-dependent population dynamics model with an addition...
AbstractA finite difference method for a system of hyperbolic partial differential-integral equation...