Abstract
We study a class of equilibrium problems which is identified with a complete metric space of functions. For most elements of this space of functions (in the sense of Baire category), we establish that the corresponding equilibrium problem possesses a unique solution and is well-posed.
Highlights
The study of equilibriumproblems has recently been a rapidly growing area of research
We show that for most elements of this space of functions A in the sense of Baire category the equilibrium problem P possesses a unique solution
The problem P possesses a unique solution for a generic typical element of A 4–6
Summary
We study a class of equilibrium problems which is identified with a complete metric space of functions. For most elements of this space of functions in the sense of Baire category , we establish that the corresponding equilibrium problem possesses a unique solution and is well-posed.
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