In this paper we consider the question of minimizing functionals defined by improper integrals. Our approach is alternative to the method of concentration-compactness and it does not require the verification of strict subaddivity. © 1994 Sociedade Brasileira de Matemática.251779
For a class of minimization problems, where the functionals are weakly lower semicontinuous, we pre...
AbstractWith the integral approach to global optimization, a class of discontinuous penalty function...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
Many issues in Physics-Mathematics or Differential Geometry involve minimization problems, where min...
We develop some variants of the concentration compactness to deals with various classes of constrain...
After the study made in the locally compact case for variational problems with some translation inva...
We investigate an infinite dimensional optimization problem which constraints are singular integral-...
We investigate an infinite dimensional optimization problem which constraints are singular integral-...
This paper is the second part of a work devoted to the study of variational problems (with constrain...
summary:To overcome the somewhat artificial difficulties in classical optimization theory concerning...
For a class of minimization problems, where the functionals are weakly lower semicontinuous, we pres...
Abstract. For a class of minimization problems, where the functionals are weakly lower semicontinuou...
summary:To overcome the somewhat artificial difficulties in classical optimization theory concerning...
summary:To overcome the somewhat artificial difficulties in classical optimization theory concerning...
We consider a general class of problems of minimization of convex integral functionals (maximization...
For a class of minimization problems, where the functionals are weakly lower semicontinuous, we pre...
AbstractWith the integral approach to global optimization, a class of discontinuous penalty function...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
Many issues in Physics-Mathematics or Differential Geometry involve minimization problems, where min...
We develop some variants of the concentration compactness to deals with various classes of constrain...
After the study made in the locally compact case for variational problems with some translation inva...
We investigate an infinite dimensional optimization problem which constraints are singular integral-...
We investigate an infinite dimensional optimization problem which constraints are singular integral-...
This paper is the second part of a work devoted to the study of variational problems (with constrain...
summary:To overcome the somewhat artificial difficulties in classical optimization theory concerning...
For a class of minimization problems, where the functionals are weakly lower semicontinuous, we pres...
Abstract. For a class of minimization problems, where the functionals are weakly lower semicontinuou...
summary:To overcome the somewhat artificial difficulties in classical optimization theory concerning...
summary:To overcome the somewhat artificial difficulties in classical optimization theory concerning...
We consider a general class of problems of minimization of convex integral functionals (maximization...
For a class of minimization problems, where the functionals are weakly lower semicontinuous, we pre...
AbstractWith the integral approach to global optimization, a class of discontinuous penalty function...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
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