AbstractWe consider the control problem for a population dynamics model with age dependence, spatial structure, and a nonlocal birth process arising as a boundary condition. We examine the controllability at a given time T and show that approximate controllability holds for every fixed finite time T. As a consequence a new uniqueness condition continuation result is proved
AbstractIn this work we consider the problem of exact controllability of the linear Lotka–McKendrick...
Considering a nonlinear dynamical system, we study the nonlinear infinite-dimensional system obtaine...
Abstract. We consider a nonlinear model for age-dependent population dynamics subject to a density d...
AbstractWe prove exact and approximate controllability for a linear age-dependent and spatially stru...
In this paper we analyse an approximate controllability result for a nonlinear population dynamics m...
Abstract: We consider a nonlinear age dependent and spatially structured popu-lation dynamics model....
We consider the internal exact controllability of a linear age and space structured population model...
We investigate the approximate controllability of a size- and space-structured population model, for...
This paper is devoted to study the null controllability properties of a population dynamics model wi...
In this article, we study the null controllability of a linear system coming from a population dyna...
Abstract. We consider the internal exact controllability of a linear age and space structured popula...
We consider an infinite dimensional nonlinear controlled system describing age-structured population...
AbstractWe consider a single species population dynamics model with age dependence, spatial structur...
Given a linear dynamical system, we investigate the linear infinite dimensional system obtained by g...
Given a linear dynamical system, we investigate the linear infinite dimensional system obtained by g...
AbstractIn this work we consider the problem of exact controllability of the linear Lotka–McKendrick...
Considering a nonlinear dynamical system, we study the nonlinear infinite-dimensional system obtaine...
Abstract. We consider a nonlinear model for age-dependent population dynamics subject to a density d...
AbstractWe prove exact and approximate controllability for a linear age-dependent and spatially stru...
In this paper we analyse an approximate controllability result for a nonlinear population dynamics m...
Abstract: We consider a nonlinear age dependent and spatially structured popu-lation dynamics model....
We consider the internal exact controllability of a linear age and space structured population model...
We investigate the approximate controllability of a size- and space-structured population model, for...
This paper is devoted to study the null controllability properties of a population dynamics model wi...
In this article, we study the null controllability of a linear system coming from a population dyna...
Abstract. We consider the internal exact controllability of a linear age and space structured popula...
We consider an infinite dimensional nonlinear controlled system describing age-structured population...
AbstractWe consider a single species population dynamics model with age dependence, spatial structur...
Given a linear dynamical system, we investigate the linear infinite dimensional system obtained by g...
Given a linear dynamical system, we investigate the linear infinite dimensional system obtained by g...
AbstractIn this work we consider the problem of exact controllability of the linear Lotka–McKendrick...
Considering a nonlinear dynamical system, we study the nonlinear infinite-dimensional system obtaine...
Abstract. We consider a nonlinear model for age-dependent population dynamics subject to a density d...