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The Optimality Conditions for Vector Extremum Problems & a Algorithm for Quadratic Programming with Linear Inequlities Constraints

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ã€Abstractã€‘ In this thesis, some topics on vector optimization theory in abstract spaces are discussed, and a algorithm for quadratic programming problem with linear inequalities constraints is studied as well. In Banach space, the optimal concept of Contingent Cone is defined, and then, a generalized constrained qualification is given, thereafter, the optimal conditions of the differentiable optimization problem are obtained in Banach space; In linear toplogical space, a important property of (weak)efficient points of set is given , and then, the sufficient and the neccessory conditions of the vector extremum problem with constraint are obtained; Finally, this thesis gives a algorithm for quadratic programming problem with linear inequalities constraints, and its convergence is analysized in some degree, moreover, this algorithm is efficient compared with the results of numerical testsæ›´å¤š è¿˜åŽŸ

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ã€Key wordsã€‘ Contingent coneï¼› Generalized constrained qualificationï¼› Generalized convex programmingï¼› Optimal conditionï¼›

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