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Characterization of optimality for the abstract convex program with finite dimensional range

Published online by Cambridge University Press:  09 April 2009

Jon M. Borwein
Jon M. Borwein
Affiliation:
Department of Mathematics, Dalhousie University, Halifax, Canada Department of Mathematics, University of Alberta, Edmonton, Canada
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Abstract

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This paper presents characterizations of optimality for the abstract convex program

when S is an arbitrary convex cone in a finite dimensional space, Ω is a convex set and p and g are respectively convex and S-convex (on Ω). These characterizations, which include a Lagrange multiplier theorem and do not presume any a priori constraint qualification, subsume those presently in the literature.

Keywords

convexityabstract programmingLagrange multipliersSlater's conditionsubgradientsduality principlesfacial reductionsymmetric matricescone of positive semi-definite matrices

MSC classification

Secondary: 90C25: Convex programming
Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 30 , Issue 4 , April 1981 , pp. 390 - 411
Copyright
Copyright © Australian Mathematical Society 1981

References

Abrams, R. A. and Kerzner, L. (1978), “A simplified test for optimality”, J. Optimization Theory Appl. 25, 161170.CrossRefGoogle Scholar
Barker, G. P. and Carlson, D. (1975), “Cones of diagonally dominant matrices”, Pacific J. Math. 57, 1532.CrossRefGoogle Scholar
Ben-Israel, A., Ben-Tal, A. and Zlobec, S. (1976), “Optimality conditions in convex programming”, The IX International Symposium on Mathematical Programming (Budapest, Hungary, August).Google Scholar
Ben-Israel, A. and Greville, T. N. E. (1973), Generalized inverse theory and applications (Wiley-Interscience, New York).Google Scholar
Ben-Tal, A. and Ben-Israel, A. (1979), “Characterizations of optimality in convex programming: the nondifferentiable case”, Applicable Anal. 9, 137156.CrossRefGoogle Scholar
Ben-Tal, A., Ben-Israel, A. and Zlobec, S. (1976), “Characterixations of optimality in convex programming without a constraint qualification”, J. Optimization Theory Appl. 20, 417437.CrossRefGoogle Scholar
Berman, A. and Ben-Israel, A. (1969), “Linear equations over cones with interior: a solvability theorem with applications to matrix theory”, (Report No. 69–1 Series in Applied Math., Northwestern University).Google Scholar
Borwein, J. (1977a), “Proper efficient points for maximizations with respect to cones”, SIAM J. Control Optimization 15, 5763.CrossRefGoogle Scholar
Borwein, J. (1977b), “Multivalued convexity and optimization: a unified approach to inequality and equality constraints”, Math. Programming 13, 183199.CrossRefGoogle Scholar
Borwein, J. (1978), “Weak tangent cones and optimization in a Banach space”, SIAM J. Control Optimization 16, 512522.CrossRefGoogle Scholar
Borwein, J. (1980a), “The geometry of Pareto efficiency over cones”, Math. Operationsforsch. Statist., 11, 235248.CrossRefGoogle Scholar
Borwein, J. (1980b), “A Lagrange multiplier theorem and a sandwich theorerr for convex relations” (Report No. 80-1, Dalhousie University, Canada) Math. Scand., to appear.Google Scholar
Borwein, J. and Wolkowicz, H. (1979), “Characterizations of optimality without constraint qualification for the abstract convex program”, (Research Report No. 14, Dalhousie University, Halifax, N. S., Canada).Google Scholar
Borwein, J. and Wolkowicz, H. (1981), “Facial reduction for a cone-convex programming problem”, J. Austral. Math. Soc. Ser. A. 30, 000–000.Google Scholar
Craven, B. D. and Zlobec, S., (1981), “Complete characterization of optimality for convex programming in Banach spaces”, Applicable Anal. 11, 6178.CrossRefGoogle Scholar
Gauvin, J. (1977), “A necessary and sufficient regularity condition to have bounded multipliers in nonconvex programming”, Math. Programming 12, 136138.CrossRefGoogle Scholar
Gauvin, J. and Tolle, J. (1977), “Differential stability in nonlinear programming, SIAM J. Control Optimization 15, 294311.CrossRefGoogle Scholar
Geoffrion, A. M. (1968), “Proper efficiency and the theory of vector maximization”, J. Math. Anal. Appl. 22, 618630.CrossRefGoogle Scholar
Holmes, R. B. (1975), Geometric functional analysis and its applications, (Springer-Verlag).CrossRefGoogle Scholar
Luenberger, D. G. (1968), “Quasi-convex programming”, SIAM J. Appl. Math. 16, 10901095.CrossRefGoogle Scholar
Luenberger, D. G. (1969), Optimization by vector space methods (John Wiley & Sons, Inc.).Google Scholar
Massam, H. (1979), “Optimality conditions for a cone-convex programming problem”, J. Austral. Math. Soc. Ser. A. 27, 141162.CrossRefGoogle Scholar
Penot, J. P. (1978), “L'optimisation ά la Pareto: deux ou trois choses que je sais d'elle” Communication au Colloque “Structure Economiques et Econometric”.Google Scholar
Peressini, A. L. (1967), Ordered topological vector spaces (Harper and Row).Google Scholar
Robertson, A. P. & Robertson, J. W. (1964), Topological vector spaces (Cambridge University Press).Google Scholar
Rockafellar, R. T. (1970a), Convex analysis (Princeton University Press).CrossRefGoogle Scholar
Rockafellar, R. T. (1970b), ‘Some convex programs whose duals are linearly constrained”, Nonlinear Programming, edited by Rosen, J. B., Mansasarian, O. L. and Ritter, K., pp. 293322 (Academic Press, N. Y.).CrossRefGoogle Scholar
Wolkowicz, H. (1978), “Calculating the cone of directions of constancy”, J. Optimization Theory Appl. 25, 451457.CrossRefGoogle Scholar
Wolkowicz, H. (1980), “Geometry of optimality conditions and constraint qualifications: the convex case”, Math. Programming 19, 3260.CrossRefGoogle Scholar
Zowe, J. (1974), “Subdifferentiability of convex functions with values in an ordered vector space”, Math. Scand. 34, 6983.CrossRefGoogle Scholar
Zowe, J. (1975a), “Linear maps majorized by a sublinear map”, Arch. Math. (Basel) 26, 637645.CrossRefGoogle Scholar
Zowe, J. (1975b), “A duality theorem for a convex programming problem in order complete vector lattices”, J. Math. Anal. Appl. 50, 273287.CrossRefGoogle Scholar
Zowe, J. (1978), “Regularity and stability for the mathematical programming problem in Banach spaces”, Preprint No. 37.Google Scholar