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General variational inequalities. (English) Zbl 0655.49005
From the abstract: “We introduce and study a new class of variational inequalities. Projection technique is used to suggest an iterative algorithm for finding the approximate solution of this class.”
Reviewer: V.Mustonen

49J40Variational methods including variational inequalities
49M99Numerical methods in calculus of variations
90C33Complementarity and equilibrium problems; variational inequalities (finite dimensions)
65K10Optimization techniques (numerical methods)
Full Text: DOI
[1] Crank, J.: Free and moving boundary problems. (1984) · Zbl 0547.35001
[2] Baiocchi, C.; Capelo, A.: Variational and quasivariationally inequalities. (1984) · Zbl 0551.49007
[3] Bensoussan, A.; Lions, J.: Applications des inequations variationelles en controle stochastique. (1978)
[4] Stampacchia, G.: Formes blinearies coercives sur LES ensembles convexes. CR acad. Sci., 4413-4416 (1964) · Zbl 0124.06401
[5] Lions, J.; Stampacchia, G.: Variational inequalities. Comm. pure appl. Math. 20, 493-519 (1967) · Zbl 0152.34601
[6] Noor, M. Aslam: An iterative scheme for a class of quasi variational inequalities. J. math, anal. Appl. 110, 463-468 (1985) · Zbl 0581.65051
[7] Noor, K. Inayat; Noor, M. Aslam: Iterative methods for a class of variational inequalities in numerical analysis of singular perturbation problems. 441-449 (1979)
[8] Glowinski, R.; Lions, J.; Tremolieres, R.: Numerical analysis of variational inequalities. (1982) · Zbl 0463.65046