We provide sufficient conditions on the objective functional and the constraint functions under which the Lagrangean can be represented by l(1) sequence of multipliers in infinite horizon discrete time optimal growth models. (C) 2003 Elsevier B.V. All rights reserved
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
We provide sufficient conditions on the objective functional and the constraint functions under whic...
We provide sufficient conditions on the objective functional and the constraint functions under whic...
International audienceWe provide sufficient conditions on the objective functional and the constrain...
International audienceWe provide sufficient conditions on the objective functional and the constrain...
International audienceWe provide sufficient conditions on the objective functional and the constrain...
International audienceWe provide sufficient conditions on the objective functional and the constrain...
We provide sufficient conditions on the objective functional and the constraint functions under whic...
AbstractA generalization of the Leontief and the Gale type model is presented in the paper. Some of ...
Some recent work on dynamic incentive constraints poses the question of existence and regularity of ...
These lecture notes provide an introduction to the optimal control theory with a focus on recent ach...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
We provide sufficient conditions on the objective functional and the constraint functions under whic...
We provide sufficient conditions on the objective functional and the constraint functions under whic...
International audienceWe provide sufficient conditions on the objective functional and the constrain...
International audienceWe provide sufficient conditions on the objective functional and the constrain...
International audienceWe provide sufficient conditions on the objective functional and the constrain...
International audienceWe provide sufficient conditions on the objective functional and the constrain...
We provide sufficient conditions on the objective functional and the constraint functions under whic...
AbstractA generalization of the Leontief and the Gale type model is presented in the paper. Some of ...
Some recent work on dynamic incentive constraints poses the question of existence and regularity of ...
These lecture notes provide an introduction to the optimal control theory with a focus on recent ach...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
In a simple discrete-time version of the Lucas (1988) model, we prove, first, that the Balanced Grow...
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