A characterization of Tyhonov well-posedness for minimum problems, with applications to variational inequalities. (English) Zbl 0479.49025


49M99 Numerical methods in optimal control
49J45 Methods involving semicontinuity and convergence; relaxation
49J40 Variational inequalities


Zbl 0381.90105
Full Text: DOI


[1] Aubin, J.P. 1979. ”Mathematical Methods of Game and Economic Theory”. Amsterdam: North-Holland. · Zbl 0452.90093
[2] Ekeland I., Bull. Amex. Math. Soc. (N.80) 1 (1979)
[3] Bkeland I., ”Convex Analysis and Variational Problems” (1976)
[4] Furi M., J. Optim. Theoiy Appl 5 (1970)
[5] Kinderlehrer, D. and Stampaschia, G. 1980. ”An Introductionto Variational Inequalities and their Applications”. New York: Academic Press.
[6] Iiucchetti R., submitted to J, Math. Anal. Appl. (1980)
[7] Mosco, U. 1973. ”An introduction to the approximate solution of variational inequalities”. Home: Cremonese. C.I.M.B. Course 1971 · Zbl 0266.49005
[8] Tyhonov A. N., U.S.S.R. Computational Math, and Math. Phys. 6 (4) pp 28– (1966) · Zbl 0212.23803
[9] Zolezzi T., Approssimaaioni e perturbàzioni diproblemi di minimo
[10] Zolezzi T., Appl. Math. Optim. 4 (4) (1978)
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