论文信息 - Second-order Sufficiency and Quadratic Growth for Nonisolated Minima

Second-order Sufficiency and Quadratic Growth for Nonisolated Minima

For standard nonlinear programming problems, the weak second-order sufficient condition is equivalent to the quadratic growth condition as far as the set of minima consists of isolated points and some qualification hypothesis holds. This kind of condition is instrumental in the study of numerical algorithms and sensitivity analysis. The arm of the paper is to study the relations between various types of sufficient conditions and quadratic growth in cases when the set of minima may have nonisolated points.

J. Frédéric Bonnans | Alexander D. Ioffe | J. F. Bonnans | A. Ioffe | J. Bonnans

[1] A. Ioffe. Necessary and Sufficient Conditions for a Local Minimum. 3: Second Order Conditions and Augmented Duality , 1979 .

[2] A. Ioffe. Regular points of Lipschitz functions , 1979 .

[3] A. Ben-Tal,et al. A unified theory of first and second order conditions for extremum problems in topological vector spaces , 1982 .

[4] Jacques Gauvin,et al. Directional Behaviour of Optimal Solutions in Nonlinear Mathematical Programming , 1988, Math. Oper. Res..

[5] A. Ioffe. Variational analysis of a composite function: A formula for the lower second order epi-derivative☆ , 1991 .

[6] A. Shapiro. Perturbation analysis of optimization problems in banach spaces , 1992 .

[7] J. F. Bonnans,et al. Expansion of exact and approximate solutions in nonlinear programming , 1992 .

[8] J. F. Bonnans,et al. Développement de solutions exactes et approchées en programmation nonlinéaire , 1992 .

[9] J. F. Bonnans. Directional derivatives of optimal solutions in smooth nonlinear programming , 1992 .

[10] Alexander D. Ioffe,et al. On Sensitivity Analysis of Nonlinear Programs in Banach Spaces: The Approach via Composite Unconstrained Optimization , 1994, SIAM J. Optim..

[11] Alexander D. Ioe. Quadratic Growth and Stability in Convex Programming Problems with Multiple Solutions , 1995 .