Non-linear parametric optimization B Bank (No Title), 1983 | 1041 | 1983 |
Nonsmooth equations in optimization: regularity, calculus, methods and applications D Klatte, B Kummer Springer Science & Business Media, 2002 | 578 | 2002 |
Asymptotic constraint qualifications and global error bounds for convex inequalities. D Klatte, W Li Mathematical programming 84 (1), 1999 | 97 | 1999 |
On second-order sufficient optimality conditions for c 1,1-optimization problems D Klatte, K Tammek Optimization 19 (2), 169-179, 1988 | 92 | 1988 |
A Frank–Wolfe type theorem for convex polynomial programs EG Belousov, D Klatte Computational Optimization and Applications 22, 37-48, 2002 | 91 | 2002 |
Error bounds for solutions of linear equations and inequalities D Klatte, G Thiere Zeitschrift für Operations Research 41, 191-214, 1995 | 89 | 1995 |
A note on quantitative stability results in nonlinear optimization D Klatte Proceedings of the 19. Jahrestagung Mathematische Optimierung …, 1987 | 80 | 1987 |
On quantitative stability for non-isolated minima D Klatte Control and Cybernetics 23 (1-2), 183-200, 1994 | 79 | 1994 |
Implicit functions and sensitivity of stationary points HT Jongen, D Klatte, K Tammer Mathematical Programming 49 (1), 123-138, 1990 | 79 | 1990 |
Metric regularity in convex semi-infinite optimization under canonical perturbations MJ Cánovas, D Klatte, MA López, J Parra SIAM Journal on Optimization 18 (3), 717-732, 2007 | 78 | 2007 |
Optimization methods and stability of inclusions in Banach spaces D Klatte, B Kummer Mathematical Programming 117, 305-330, 2009 | 77 | 2009 |
Constrained minima and Lipschitzian penalties in metric spaces D Klatte, B Kummer SIAM Journal on Optimization 13 (2), 619-633, 2002 | 65 | 2002 |
Upper Lipschitz behavior of solutions to perturbed. C1,1 programs D Klatte Mathematical Programming 88, 285-311, 2000 | 64 | 2000 |
Regularity and stability in nonlinear semi-infinite optimization D Klatte, R Henrion Semi-infinite programming, 69-102, 1998 | 64 | 1998 |
Strong stability of stationary solutions and Karush-Kuhn-Tucker points in nonlinear optimization D Klatte, K Tammer Annals of Operations Research 27, 285-307, 1990 | 63 | 1990 |
Lipschitz and Hölder stability of optimization problems and generalized equations H Gfrerer, D Klatte Mathematical Programming 158, 35-75, 2016 | 59 | 2016 |
Stability properties of infima and optimal solutions of parametric optimization problems D Klatte, B Kummer Nondifferentiable Optimization: Motivations and Applications: Proceedings of …, 1985 | 54 | 1985 |
On the stability of local and global optimal solutions in parametric problems of nonlinear programming: Part I and II D Klatte na, 1985 | 52 | 1985 |
Stable local minimizers in semi-infinite optimization: regularity and second-order conditions D Klatte Journal of Computational and Applied Mathematics 56 (1-2), 137-157, 1994 | 49 | 1994 |
Hoffman’s error bound for systems of convex inequalities D Klatte Mathematical programming with data perturbations, 185-199, 2020 | 42 | 2020 |