In this paper we investigate the Aubin property of the solution map of a parametric equilibrium problem, by providing a connection with a suitable behaviour of the diagonal subdifferential operator associated to the equilibrium bifunction. In particular, we shed some light on the relationship between metric regularity and subregularity of the diagonal subdifferential, on one side, and some properties of the bifunction, on the other side

Bianchi, M., Kassay, G., Pini, R. (2017). Stability of Equilibria via Regularity of the Diagonal Subdifferential Operator. SET-VALUED AND VARIATIONAL ANALYSIS, 25(5), 789-805 [10.1007/s11228-017-0433-8].

Stability of Equilibria via Regularity of the Diagonal Subdifferential Operator

Pini, R
2017

Abstract

In this paper we investigate the Aubin property of the solution map of a parametric equilibrium problem, by providing a connection with a suitable behaviour of the diagonal subdifferential operator associated to the equilibrium bifunction. In particular, we shed some light on the relationship between metric regularity and subregularity of the diagonal subdifferential, on one side, and some properties of the bifunction, on the other side
Articolo in rivista - Articolo scientifico
Parametric equilibrium problem; diagonal subdifferential; generalized equation; sensitivity analysis; metric regularity; metric subregularity
English
2017
25
5
789
805
none
Bianchi, M., Kassay, G., Pini, R. (2017). Stability of Equilibria via Regularity of the Diagonal Subdifferential Operator. SET-VALUED AND VARIATIONAL ANALYSIS, 25(5), 789-805 [10.1007/s11228-017-0433-8].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/184309
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