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We consider several versions of the barrier method for a general equilibrium problem with nonlinear constraints in a reflexive Banach space setting. We suggest weak coercivity conditions instead of (generalized) monotonicity, including one containing a perturbed barrier function, in order to entail solutions for the equilibrium problem. We obtain convergence properties of the method under mild assumptions.

Pini, R., Bianchi, M., Konnov, I. (2017). Barrier methods for equilibrium problems. PURE AND APPLIED FUNCTIONAL ANALYSIS, 2(1), 1-10.

Barrier methods for equilibrium problems

Pini, R;
2017

Abstract

We consider several versions of the barrier method for a general equilibrium problem with nonlinear constraints in a reflexive Banach space setting. We suggest weak coercivity conditions instead of (generalized) monotonicity, including one containing a perturbed barrier function, in order to entail solutions for the equilibrium problem. We obtain convergence properties of the method under mild assumptions.
Articolo in rivista - Articolo scientifico
Equilibrium problems; Banach spaces; non-monotone bifunctions; barrier method; regularization method; coercivity conditions; weak convergence
English
2017
2
1
1
10
none
Pini, R., Bianchi, M., Konnov, I. (2017). Barrier methods for equilibrium problems. PURE AND APPLIED FUNCTIONAL ANALYSIS, 2(1), 1-10.
01 - Articolo su rivista
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/184326
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