ABSTRACT ' Existence theorems are proved fot basic Problems of Lagrange in the calculus of variarions and optimal control theory, in particular problems for arcs with both endpoints fixed. Emphasis is placed on deriving continuity and growth properties of che minimum value of the integral as a function of the endpoints of the arc and the interval of integration. Control regions are not required to be bounded. Some results are also obtained for problems of Bolza. Coniugate convex functions and duality are used extensively in the develop' ment, but the problems themselves are not assumed to be especially ttconvex". Constraints are incorporated by the device of allowing the Lagrangian function to be extended-real-valued. This ne...
This paper provides necessary conditions of optimality for a general variational problem for which t...
AbstractIn this paper we consider linear control systems on Rn with integral quadratic cost function...
We consider the limiting case alpha = infinity of the problem of minimizing integral(Omega) (\\del u...
Abstract. Methods of convex analysis are applied to certain problems of Lagrange and Bolza in optima...
An arc C is a collection of parameters bp (p = 1, , r) on an open set B and sets of functions y\x)9 ...
AbstractThe existence of solutions is established for a very general class of problems in the calcul...
We consider the following optimization problem: in an abstract set X, find and element x that minimi...
AbstractWe consider the problem of minimizing a function over a region defined by an arbitrary set, ...
Abstract. Existence theorems are proved for Lagrange problems of optimization in a given domain G wi...
International audienceIn this paper we are concerned with generalised L 1-minimisation problems, i.e...
In this paper we are concerned with generalised L1-minimisation problems, i.e. Bolza problems involv...
International audienceWe consider a Bolza optimal control problem whose Lagrangian, possibly extende...
AbstractIn this paper, we establish necessary optimality conditions for a static minmax programming ...
In this paper, a class of optimal control problems with state variable inequality constraints is con...
This thesis is concerned with the calculus of variations on bounded domains. The critical points of ...
This paper provides necessary conditions of optimality for a general variational problem for which t...
AbstractIn this paper we consider linear control systems on Rn with integral quadratic cost function...
We consider the limiting case alpha = infinity of the problem of minimizing integral(Omega) (\\del u...
Abstract. Methods of convex analysis are applied to certain problems of Lagrange and Bolza in optima...
An arc C is a collection of parameters bp (p = 1, , r) on an open set B and sets of functions y\x)9 ...
AbstractThe existence of solutions is established for a very general class of problems in the calcul...
We consider the following optimization problem: in an abstract set X, find and element x that minimi...
AbstractWe consider the problem of minimizing a function over a region defined by an arbitrary set, ...
Abstract. Existence theorems are proved for Lagrange problems of optimization in a given domain G wi...
International audienceIn this paper we are concerned with generalised L 1-minimisation problems, i.e...
In this paper we are concerned with generalised L1-minimisation problems, i.e. Bolza problems involv...
International audienceWe consider a Bolza optimal control problem whose Lagrangian, possibly extende...
AbstractIn this paper, we establish necessary optimality conditions for a static minmax programming ...
In this paper, a class of optimal control problems with state variable inequality constraints is con...
This thesis is concerned with the calculus of variations on bounded domains. The critical points of ...
This paper provides necessary conditions of optimality for a general variational problem for which t...
AbstractIn this paper we consider linear control systems on Rn with integral quadratic cost function...
We consider the limiting case alpha = infinity of the problem of minimizing integral(Omega) (\\del u...