• Suche: Well-posed optimization problems

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Genericity of well-posed vector optimization problems
Rocca, Matteo

Mathematics - Optimizati...
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Well-posed optimization problems ; Well-posed optimalizační úlohy
Šmaňko, Bohdan ; Lachout, Petr ; Branda, Martin

Well-posed optimization... Well-posed optimalizační...
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DISCONTINUOUS BUT WELL-POSED OPTIMIZATION PROBLEMS.
Morgan, Jacqueline ; Scalzo, Vincenzo
SIAM Journal on Optimization. 2006, Vol. 17 Issue 3, p861-870. 10p.

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Accuracy Estimates of Regularization Methods and the Well-Posedness of Nonlinear Constrained Optimization Problems.
Kokurin, M. Yu.
Russian Mathematics; Aug2025, Vol. 69 Issue 8, p12-25, 14p

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WELL-POSED OPTIMIZATION PROBLEMS AND A NEW TOPOLOGY FOR THE CLOSED SUBSETS OF A METRIC SPACE
BEER, GERALD ; LUCCHETTI, ROBERTO
The Rocky Mountain Journal of Mathematics, 1993 Oct 01. 23(4), 1197-1220.

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Generic continuity of the perturbed minima of certain parametric optimization problems
Topalova, Hristina ; Zlateva, Nadia

Mathematics - Optimizati... Mathematics - Functional... 46N10, 49J45, 90C26
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Characterizations of generalized Levitin–Polyak well-posed set optimization problems
Khoshkhabar-amiranloo, S.
Optimization letters. 13(1):147-161

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The regularization continuation method with an adaptive time step control for linearly constrained optimization problems
Luo, Xin-long ; Xiao, Hang
In Applied Numerical Mathematics November 2022 181:255-276

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15

Extended well-posedness for vector optimization problems with connected set constraints
Sun, Hai ; Chen, Jia-wei ; Wan, Zhongping
2010 International Conference on Computer Application and System Modeling (ICCASM 2010) Computer Application and System Modeling (ICCASM), 2010 International Conference on. 7:V7-13-V7-15 Oct, 2010

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Scalarization of Levitin–Polyak well-posed set optimization problems
Khoshkhabar-amiranloo, S. ; Khorram, E.
Optimization. 66(1):113-127

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Inverse Optimization: Theory and Applications.
Chan, Timothy C. Y. ; Mahmood, Rafid ; Zhu, Ian Yihang
Operations Research. Mar/Apr2025, Vol. 73 Issue 2, p1046-1074. 29p.

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Almost Every Convex or Quadratic Programming Problem Is Well Posed.
Ioffe, A. D. ; Lucchetti, R. E. ; Revalski, J. P.
Mathematics of Operations Research. May2004, Vol. 29 Issue 2, p369-382. 14p.

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