Limit vector variational inequalities and market equilibrium problems

Monica Bianchi; I. V. Konnov; R. Pini

doi:10.1007/s11590-019-01500-2

Limit vector variational inequalities and market equilibrium problems

Monica Bianchi, I. V. Konnov, R. Pini

Risultato della ricerca: Contributo in rivista › Articolo in rivista › peer review

Abstract

In a finite-dimensional setting we investigate the solvability of a general vector variational inequality via the convergence of solutions of suitable approximating vector variational inequalities defined with more regular data. The theoretical results obtained in a very general framework are successfully applied to the study of a vector market equilibrium problem where instead of exact values of the cost mapping, feasible set and order cone, only approximation sequences of these data are available

Lingua originale	English
pagine (da-a)	817-832
Numero di pagine	16
Rivista	Optimization Letters
DOI	https://doi.org/10.1007/s11590-019-01500-2
Stato di pubblicazione	Pubblicato - 2020

Keywords

Approximation sequence
Coercivity conditions
Vector variational inequality

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10.1007/s11590-019-01500-2

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title = "Limit vector variational inequalities and market equilibrium problems",

abstract = "In a finite-dimensional setting we investigate the solvability of a general vector variational inequality via the convergence of solutions of suitable approximating vector variational inequalities defined with more regular data. The theoretical results obtained in a very general framework are successfully applied to the study of a vector market equilibrium problem where instead of exact values of the cost mapping, feasible set and order cone, only approximation sequences of these data are available",

keywords = "Approximation sequence, Coercivity conditions, Vector variational inequality, Approximation sequence, Coercivity conditions, Vector variational inequality",

author = "Monica Bianchi and Konnov, {I. V.} and R. Pini",

year = "2020",

doi = "10.1007/s11590-019-01500-2",

language = "English",

pages = "817--832",

journal = "Optimization Letters",

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T1 - Limit vector variational inequalities and market equilibrium problems

AU - Bianchi, Monica

AU - Konnov, I. V.

AU - Pini, R.

PY - 2020

Y1 - 2020

N2 - In a finite-dimensional setting we investigate the solvability of a general vector variational inequality via the convergence of solutions of suitable approximating vector variational inequalities defined with more regular data. The theoretical results obtained in a very general framework are successfully applied to the study of a vector market equilibrium problem where instead of exact values of the cost mapping, feasible set and order cone, only approximation sequences of these data are available

AB - In a finite-dimensional setting we investigate the solvability of a general vector variational inequality via the convergence of solutions of suitable approximating vector variational inequalities defined with more regular data. The theoretical results obtained in a very general framework are successfully applied to the study of a vector market equilibrium problem where instead of exact values of the cost mapping, feasible set and order cone, only approximation sequences of these data are available

KW - Approximation sequence

KW - Coercivity conditions

KW - Vector variational inequality

KW - Approximation sequence

KW - Coercivity conditions

KW - Vector variational inequality

UR - http://hdl.handle.net/10807/145702

U2 - 10.1007/s11590-019-01500-2

DO - 10.1007/s11590-019-01500-2

M3 - Article

SN - 1862-4472

SP - 817

EP - 832

JO - Optimization Letters

JF - Optimization Letters

ER -

Limit vector variational inequalities and market equilibrium problems

Abstract

Keywords

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