Free Access
Issue
RAIRO-Oper. Res.
Volume 24, Number 3, 1990
Page(s) 287 - 294
DOI https://doi.org/10.1051/ro/1990240302871
Published online 06 February 2017
  • 1. A. R. CONN and N. I. M. GOULD, On the Location of Indefinite Descent for Nonlinear Programming Algorithm, SIAM J. Num. Anal, 1984, 21 pp. 1162-1179. [MR: 765513] [Zbl: 0578.65061] [Google Scholar]
  • 2. A. L. DONTCHEV and H. Th. JONGEN, On the Regularity of the Kuhn-Tucker Curve, SIAM J. Control Optimization 1986, 24, pp. 169-176. [MR: 826510] [Zbl: 0598.90086] [Google Scholar]
  • 3. R. FLETCHER, Practical Methods of Optimization, John Wïley, Chichester, 1981. [MR: 1867781] [Zbl: 0474.65043] [Google Scholar]
  • 4. S. P. HAN, A Hybrid Method for Nonlinear Programming, Nonlinear Programming 3, Academic Press, New York, 1978, pp. 65-95. [MR: 507859] [Zbl: 0458.90054] [Google Scholar]
  • 5. H. Th. JONGEN, T. MÖBERT and K. TAMMER, On Iterated Minimization in Nonconvex Optimization, Report 488, Twente University of Technology, N. L. [Zbl: 0626.90080] [Google Scholar]
  • 6. A. KIELBASINSKI and H. SCHWETLICK, Numerische Lineare Algebra, Dt. Verlag d. Wiss., Berlin, 1988. [MR: 1081148] [Zbl: 0635.65024] [Google Scholar]
  • 7. F. KÖRNER and B. LUDERER, A Simultaneous Method for Checking Second-Order Kuhn-Tucker Conditions for Equality Constrained Nonlinear Programming Problems, Syst. Anal. Sim. Mod., 1988, 5, pp. 51-57. [MR: 936145] [Zbl: 0647.90074] [Google Scholar]
  • 8. F. KÖRNER, Remarks on Second-Order Conditions in Connection with the Algorithm of Beale for Quadratic Programming, Europ. J. Oper. Res., 1989, 40, pp. 85-89. [MR: 995553] [Zbl: 0683.90058] [Google Scholar]
  • 9. G. P. McCORMICK, Nonlinear Programming. Theory, Algorithms, and Applications, John Wiley, Chichester, 1983. [MR: 693095] [Zbl: 0193.18805] [Google Scholar]
  • 10. H. SCHWETLICK, Numerische Lösung nichtlinearer Gleichungssysteme, Dt. Verlagd. Wiss., Berlin, 1979. [MR: 519682] [Zbl: 0408.65027] [Google Scholar]
  • 11. A. SHAPIRO, Second-Order Derivatives of Extremal-Value Functions and Optimality Conditions for Semi-Infinite Programs, Math. Oper. Res., 1985,10, pp. 207-219. [MR: 793879] [Zbl: 0569.90070] [Google Scholar]
  • 12. A. SHAPIRO, Second-Order Sensitivity Analysis and Asymptotic Theory of Parametrized Nonlinear Programs, Math. Prog., 1985, 33, pp. 280-299. [MR: 816106] [Zbl: 0579.90088] [Google Scholar]
  • 13. J. E. SPINGARN and R. T. ROCKAFELLAR, The Generic Nature of Optimality Conditions in Nonlinear Programming, Math. Oper. Res., 1979, 40, pp. 425-430. [MR: 549128] [Zbl: 0423.90071] [Google Scholar]

Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.

Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.

Initial download of the metrics may take a while.