论文信息 - Polyhedral extensions of some theorems of linear programming

Polyhedral extensions of some theorems of linear programming

Three theorems of linear programming form our starting point: Tucker's theorem (1956) concerning the existence of optimal solutions satisfying the complementary slackness conditions strictly, and Williams' two theorems (1970) concerning the coordinatewise complementary behavior of feasible and optimal solutions. Here, we establish that the same phenomena hold in another, more versatile framework involving general polyhedral convexity. As one main application, the results are transferred into the context of the monotone complementarity problem. Several other theoretical applications are indicated.

L. McLinden | L. McLinden

[1] A. Williams. Complementarity Theorems for Linear Programming , 1970 .

[2] L. McLinden. An analogue of Moreau's proximation theorem, with application to the nonlinear complementarity problem. , 1980 .

[3] R. T. Rockafellar,et al. A general correspondence between dual minimax problems and convex programs , 1968 .

[4] L. McLinden,et al. Symmetric duality for structured convex programs , 1977 .

[5] A. Williams,et al. Boundedness relations for linear constraint sets , 1970 .

[6] S. Itoh,et al. Variational inequalities and complementarity problems , 1978 .

[7] J. Stoer,et al. Convexity and Optimization in Finite Dimensions I , 1970 .

[8] E. Eisenberg. Duality in homogeneous programming , 1961 .