Add to ORKGAge-structured and size-structured population models with a distributed harvesting control are considered and their qualitative behaviors are compared. The maximum principle and bang-bang structure of the optimal control are established for a size-structured forestry model with carbon sequestration benefits. © 2009
The paper analyzes nonlinear optimal control of integral-differential equations that describe the op...
The successful management of biological populations is essential to both the world's economic and en...
AbstractThe paper analyzes nonlinear optimal control of integral–differential equations that describ...
Age-structured and size-structured population models with a distributed harvesting control are consi...
An optimal harvesting problem for linear size-structured population dynamics is considered. A maximu...
An optimal harvesting problem is analyzed in the Lotka-McKendrick model of age-structured population...
It has long been recognized that demographic structure within a population can significantly affect ...
The paper analyzes optimal harvesting of age-structured populations described by the Lotka-McKendrik...
AbstractA harvesting problem is considered for a size structured population model with separable mor...
A size-structured clonal model is formulated for a population subject to constant-fraction harvestin...
We study an optimal harvesting for a nonlinear age-spatial-structured population dynamic model, wher...
Graduation date: 1988We investigate the optimal harvesting strategies for McKendrick type population...
In this paper, we deal with an optimal harvesting problem for a periodic predator-prey hybrid system...
AbstractIt is the purpose of this paper to analyze the exploitation of the stage-structured singleau...
This paper brings both intertemporal and age-dependent features to a theory of population policy at ...
The paper analyzes nonlinear optimal control of integral-differential equations that describe the op...
The successful management of biological populations is essential to both the world's economic and en...
AbstractThe paper analyzes nonlinear optimal control of integral–differential equations that describ...
Age-structured and size-structured population models with a distributed harvesting control are consi...
An optimal harvesting problem for linear size-structured population dynamics is considered. A maximu...
An optimal harvesting problem is analyzed in the Lotka-McKendrick model of age-structured population...
It has long been recognized that demographic structure within a population can significantly affect ...
The paper analyzes optimal harvesting of age-structured populations described by the Lotka-McKendrik...
AbstractA harvesting problem is considered for a size structured population model with separable mor...
A size-structured clonal model is formulated for a population subject to constant-fraction harvestin...
We study an optimal harvesting for a nonlinear age-spatial-structured population dynamic model, wher...
Graduation date: 1988We investigate the optimal harvesting strategies for McKendrick type population...
In this paper, we deal with an optimal harvesting problem for a periodic predator-prey hybrid system...
AbstractIt is the purpose of this paper to analyze the exploitation of the stage-structured singleau...
This paper brings both intertemporal and age-dependent features to a theory of population policy at ...
The paper analyzes nonlinear optimal control of integral-differential equations that describe the op...
The successful management of biological populations is essential to both the world's economic and en...
AbstractThe paper analyzes nonlinear optimal control of integral–differential equations that describ...