DocumentCode
1963565
Title
Smoothed Analysis of Multiobjective Optimization
Author
Roglin, H. ; Teng, Shang-Hua
Author_Institution
Dept. of Quantitative Econ., Maastricht Univ., Maastricht, Netherlands
fYear
2009
fDate
25-27 Oct. 2009
Firstpage
681
Lastpage
690
Abstract
We prove that the number of Pareto-optimal solutions in any multiobjective binary optimization problem with a finite number of linear objective functions is polynomial in the model of smoothed analysis. This resolves a conjecture of Rene Beier. Moreover, we give polynomial bounds on all finite moments of the number of Pareto-optimal solutions, which yields the first non-trivial concentration bound for this quantity. Using our new technique, we give a complete characterization of polynomial smoothed complexity for binary optimization problems, which strengthens an earlier result due to Beier and Vo¿cking.
Keywords
Pareto optimisation; operations research; polynomial approximation; smoothing methods; Pareto-optimal solutions; linear objective functions; multiobjective binary optimization problem; multiobjective optimization; polynomial functions; polynomial smoothed complexity; smoothed analysis; Algorithm design and analysis; Clustering algorithms; Computer science; Constraint optimization; Filters; Pareto analysis; Pathology; Polynomials; Search methods; Tree graphs; Pareto-optimal solutions; multiobjective optimization; smoothed analysis;
fLanguage
English
Publisher
ieee
Conference_Titel
Foundations of Computer Science, 2009. FOCS '09. 50th Annual IEEE Symposium on
Conference_Location
Atlanta, GA
ISSN
0272-5428
Print_ISBN
978-1-4244-5116-6
Type
conf
DOI
10.1109/FOCS.2009.21
Filename
5438586
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