AbstractWe develop a numerical algorithm for approximation of solutions for linear age-structured population models. The construction is based on approximation of age distributions by modified Legendre polynomials and uses the Trotter-Kato theorem of semigroup theory for the corresponding abstract Cauchy problem. Unbounded resp. nonintegrable mortality rates are admissible
The prediction and analysis of changes in the numbers of biological populations rest on mathematical...
AbstractThis paper considers the question of the stable determination of the death rate λ in the fun...
This paper presents a practical numerical method for separating and estimating growth and mortality ...
AbstractWe develop a numerical algorithm for approximation of solutions for linear age-structured po...
Abstract. We consider a model of population dynamics whose mortality function is unbounded. We note ...
AbstractIn this paper we present a class of rapidly convergent numerical schemes to solve the Sharpe...
A semi-discretization method for solving an age-dependent population dynamics model with an addition...
AbstractWe propose a new numerical method for the approximation of solutions to a non-autonomous for...
AbstractThe Lotka–McKendrick's model is a well-known model which describes the evolution in time of ...
Abstract A semi-discretization method for solving an age-dependent population dynamics model with an...
Leslie (1945) models the evolution in discrete time of a closed, single-sex population with discrete...
WOS: 000287923900006In this study, we investigate nonlinear age-structured population models. The nu...
This book provides an introduction to age-structured population modeling which emphasises the connec...
A non-linear age-structured population dynamic model described by partial integro-differential equat...
AbstractContinuous Galerkin finite element methods in the age-time domain are proposed to approximat...
The prediction and analysis of changes in the numbers of biological populations rest on mathematical...
AbstractThis paper considers the question of the stable determination of the death rate λ in the fun...
This paper presents a practical numerical method for separating and estimating growth and mortality ...
AbstractWe develop a numerical algorithm for approximation of solutions for linear age-structured po...
Abstract. We consider a model of population dynamics whose mortality function is unbounded. We note ...
AbstractIn this paper we present a class of rapidly convergent numerical schemes to solve the Sharpe...
A semi-discretization method for solving an age-dependent population dynamics model with an addition...
AbstractWe propose a new numerical method for the approximation of solutions to a non-autonomous for...
AbstractThe Lotka–McKendrick's model is a well-known model which describes the evolution in time of ...
Abstract A semi-discretization method for solving an age-dependent population dynamics model with an...
Leslie (1945) models the evolution in discrete time of a closed, single-sex population with discrete...
WOS: 000287923900006In this study, we investigate nonlinear age-structured population models. The nu...
This book provides an introduction to age-structured population modeling which emphasises the connec...
A non-linear age-structured population dynamic model described by partial integro-differential equat...
AbstractContinuous Galerkin finite element methods in the age-time domain are proposed to approximat...
The prediction and analysis of changes in the numbers of biological populations rest on mathematical...
AbstractThis paper considers the question of the stable determination of the death rate λ in the fun...
This paper presents a practical numerical method for separating and estimating growth and mortality ...
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