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Paper   IPM / M / 17361
School of Mathematics
  Title:   Noncoercive and noncontinuous equilibrium problems: Existence theorem in infinite-dimensional spaces
  Author(s):  Hamid Reza Hajisharifi (Joint with F. Fakhar and Z. Soltani)
  Status:   Published
  Journal: J. Glob. Optim.
  Vol.:  86
  Year:  2023
  Pages:   989-1003
  Supported by:  IPM
  Abstract:
In this paper, we extend the definition of the qx-asymptotic functions, for an extended realvalued function defined on the infinite-dimensional topological normed spaces without lower semicontinuity or quasi-convexity condition. As the main result, by using some asymptotic conditions, we obtain sufficient optimality conditions for the existence of solutions to equilibrium problems, under weaker assumptions of continuity and convexity, when the feasible set is an unbounded subset of infinite-dimensional space. Also, as a corollary, we obtain necessary and sufficient optimality conditions for the existence of solutions to equilibrium problems with an unbounded feasible set. Finally, as an application, we establish a result for the existence of solutions to minimization problems.

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