论文信息 - The tight absolute bound of First Fit in the parameterized case

The tight absolute bound of First Fit in the parameterized case

The tight asymptotic approximation ratio of the classical bin packing algorithm called First Fit was known for many years, also in the parameterized case, when any item has size of at most 1 / d , where d is integer. But the tight absolute bound was found only recently, and only for d = 1 . Here we give the tight absolute approximation ratio of First Fit for any d ? 2 . In fact, we do more. For any value of OPT (the number of bins in an optimum solution) we determine that exactly how large FF (the number of bins created by First Fit) can be in the worst case.The proof is very simple, since we can apply the lower bound construction of case d = 1 , in a slightly modified form.

György Dósa | G. Dósa

[1] Jeffrey D. Ullman,et al. Worst-Case Performance Bounds for Simple One-Dimensional Packing Algorithms , 1974, SIAM J. Comput..

[2] David S. Johnson,et al. Computers and Intractability: A Guide to the Theory of NP-Completeness , 1978 .

[3] Jirí Sgall,et al. Optimal Analysis of Best Fit Bin Packing , 2014, ICALP.

[4] Jirí Sgall,et al. First Fit bin packing: A tight analysis , 2013, STACS.

[5] David S. Johnson,et al. Computers and In stractability: A Guide to the Theory of NP-Completeness. W. H Freeman, San Fran , 1979 .

[6] David P. Williamson,et al. The Design of Approximation Algorithms , 2011 .

[7] Jeffrey D. Ullman,et al. The performance of a memory allocation algorithm , 1971 .

[8] Andrew Chi-Chih Yao,et al. Resource Constrained Scheduling as Generalized Bin Packing , 1976, J. Comb. Theory A.

[9] Edward G. Coffman,et al. Approximation algorithms for bin packing: a survey , 1996 .

[10] György Dósa,et al. First Fit Algorithm for Bin Packing , 2016, Encyclopedia of Algorithms.

[11] Jeffrey D. Ullman,et al. Worst-case analysis of memory allocation algorithms , 1972, STOC.

[12] David S. Johnson,et al. Near-optimal bin packing algorithms , 1973 .