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Sensitivity analysis for abstract equilibrium problems. (English) Zbl 1068.49005

Summary: We develop the general framework of sensitivity analysis for equilibrium problems in the setting of a normed topological vector space. Our approach does not make any recourse to geometrical properties and the obtained result can be viewed as an extension and generalization of the well-known results (on variational inequalities) in the literature. Even though we have worked under arbitrary constraints \(\mathcal K_{\lambda}\) with Hölder-property – that have been decisive in our treatment – we have obtained, in a similar spirit of A. Domokos [J. Math. Anal. Appl. 230, 382–389 (1999; Zbl 0927.49005)], the best lower bound for the continuity modulus despite of the properties of the boundary of \(\mathcal K_{\lambda}\).

MSC:

49J40 Variational inequalities

Citations:

Zbl 0927.49005
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References:

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