[[abstract]]In this paper, we introduce the concept of τ -function which generalizes the concept of w-distance studied in the literature. We establish a generalized Ekeland’s variational principle in the setting of lower semicontinuous from above and τ -functions. As applications of our Ekeland’s variational principle, we derive generalized Caristi’s (common) fixed point theorems, a generalized Takahashi’s nonconvex minimization theorem, a nonconvex minimax theorem, a nonconvex equilibrium theorem and a generalized flower petal theorem for lower semicontinuous from above functions or lower semicontinuous functions in the complete metric spaces. We also prove that these theorems also imply our Ekeland’s variational principle. © 2005 Elsevier...
We prove a new minimization theorem in quasi-metric spaces, which improves the results of Takahashi ...
In this paper, lower semi-continuous functions are used to extend Ekeland’s variational principle to...
Functions defined on metric spaces are studied. For these functions, a generalized Caristi-like cond...
AbstractIn this paper, we introduce the concept of τ-function which generalizes the concept of w-dis...
Abstract In this paper, a new version of Ekeland’s variational principle by using the concept of τ-d...
Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, p...
With a recent result of Suzuki (2001) we extend Caristi-Kirk's fixed point theorem, Ekeland'...
We consider a distance function on generalized metric spaces and we get a generalization of Ekeland ...
With a recent result of Suzuki (2001) we extend Caristi-Kirk's fixed point theorem, Ekeland's varia...
AbstractIn this paper, we obtain a general Ekeland’s variational principle for set-valued mappings i...
AbstractWe present a simple proof of vectorial Ekeland's variational principle, vectorial Caristi's ...
[[abstract]]In this paper, we first give a generalized Takahashi’s existence theorem. From the exist...
[[abstract]]In this paper, we establish several different versions of generalized Ekeland’s variatio...
AbstractIn this paper, we consider the strong Ekeland variational principle due to Georgiev [P.G. Ge...
AbstractThis paper introduces a vectorial form of equilibrium version of Ekeland-type variational pr...
We prove a new minimization theorem in quasi-metric spaces, which improves the results of Takahashi ...
In this paper, lower semi-continuous functions are used to extend Ekeland’s variational principle to...
Functions defined on metric spaces are studied. For these functions, a generalized Caristi-like cond...
AbstractIn this paper, we introduce the concept of τ-function which generalizes the concept of w-dis...
Abstract In this paper, a new version of Ekeland’s variational principle by using the concept of τ-d...
Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, p...
With a recent result of Suzuki (2001) we extend Caristi-Kirk's fixed point theorem, Ekeland'...
We consider a distance function on generalized metric spaces and we get a generalization of Ekeland ...
With a recent result of Suzuki (2001) we extend Caristi-Kirk's fixed point theorem, Ekeland's varia...
AbstractIn this paper, we obtain a general Ekeland’s variational principle for set-valued mappings i...
AbstractWe present a simple proof of vectorial Ekeland's variational principle, vectorial Caristi's ...
[[abstract]]In this paper, we first give a generalized Takahashi’s existence theorem. From the exist...
[[abstract]]In this paper, we establish several different versions of generalized Ekeland’s variatio...
AbstractIn this paper, we consider the strong Ekeland variational principle due to Georgiev [P.G. Ge...
AbstractThis paper introduces a vectorial form of equilibrium version of Ekeland-type variational pr...
We prove a new minimization theorem in quasi-metric spaces, which improves the results of Takahashi ...
In this paper, lower semi-continuous functions are used to extend Ekeland’s variational principle to...
Functions defined on metric spaces are studied. For these functions, a generalized Caristi-like cond...