AbstractA finite difference method for a system of hyperbolic partial differential-integral equations describing nonlinearly interacting age-dependent populations dynamics is discussed. Boundedness of the numerical approximations and unconditional convergence of the method are proved. The proof is based on a discrete Gronwall-type inequality established in the paper
The aim of this work is to give a direct and constructive proof of existence and uniqueness of a glo...
AbstractA model is presented for a single species population moving in a limited one-dimensional env...
A nonlinear age-structured population dynamic model described by partial integro-differential equati...
AbstractA finite difference method for a system of hyperbolic partial differential-integral equation...
AbstractA numerical method is proposed to approximate the solution of a nonlinear and nonlocal syste...
summary:We study a numerical method for the diffusion of an age-structured population in a spatial e...
AbstractThis paper addresses the issue of an existence theory for a system of hyperbolic partial dif...
This paper studies a parameter estimation problem for the Gurtin-MacCamy equation, which is a nonlin...
AbstractThis paper is devoted to a new approach for the study of nonlinear age dependent population ...
AbstractA system of nonlinear hyperbolic equations with boundary conditions of renewal type is studi...
AbstractWe propose a new numerical method for the approximation of solutions to a non-autonomous for...
AbstractThe large time behavior of numerical solutions for a model describing age-structured populat...
AbstractWe analyze an upwind method for a nonlinear hyperbolic integro-differential equation with an...
AbstractInvestigated is the method of lines and a corresponding numerical method for the solution of...
. This paper considers a system of coupled second order parabolic and first order hyperbolic equatio...
The aim of this work is to give a direct and constructive proof of existence and uniqueness of a glo...
AbstractA model is presented for a single species population moving in a limited one-dimensional env...
A nonlinear age-structured population dynamic model described by partial integro-differential equati...
AbstractA finite difference method for a system of hyperbolic partial differential-integral equation...
AbstractA numerical method is proposed to approximate the solution of a nonlinear and nonlocal syste...
summary:We study a numerical method for the diffusion of an age-structured population in a spatial e...
AbstractThis paper addresses the issue of an existence theory for a system of hyperbolic partial dif...
This paper studies a parameter estimation problem for the Gurtin-MacCamy equation, which is a nonlin...
AbstractThis paper is devoted to a new approach for the study of nonlinear age dependent population ...
AbstractA system of nonlinear hyperbolic equations with boundary conditions of renewal type is studi...
AbstractWe propose a new numerical method for the approximation of solutions to a non-autonomous for...
AbstractThe large time behavior of numerical solutions for a model describing age-structured populat...
AbstractWe analyze an upwind method for a nonlinear hyperbolic integro-differential equation with an...
AbstractInvestigated is the method of lines and a corresponding numerical method for the solution of...
. This paper considers a system of coupled second order parabolic and first order hyperbolic equatio...
The aim of this work is to give a direct and constructive proof of existence and uniqueness of a glo...
AbstractA model is presented for a single species population moving in a limited one-dimensional env...
A nonlinear age-structured population dynamic model described by partial integro-differential equati...