DocumentCode
3639492
Title
The Sub-exponential Upper Bound for On-Line Chain Partitioning
Author
Bartlomiej Bosek;Tomasz Krawczyk
Author_Institution
Theor. Comput. Sci., Jagiellonian Univ., Krakó
fYear
2010
Firstpage
347
Lastpage
354
Abstract
The main question in the on-line chain partitioning problem is to determine whether there exists an algorithm that partitions on-line posets of width at most $w$ into polynomial number of chains – see Trotter´s chapter Partially ordered sets in the Handbook of Combinatorics. So far the best known on-line algorithm of Kier stead used at most $(5^w-1)/4$ chains, on the other hand Szemer\´{e}di proved that any on-line algorithm requires at least $\binom{w+1}{2}$ chains. These results were obtained in the early eighties and since then no progress in the general case has been done. We provide an on-line algorithm that partitions orders of width $w$ into at most $w^{16\log{w}}$ chains. This yields the first sub-exponential upper bound for on-line chain partitioning problem.
Keywords
"Games","Partitioning algorithms","Color","Upper bound","Computer science","Bismuth","Polynomials"
Publisher
ieee
Conference_Titel
Foundations of Computer Science (FOCS), 2010 51st Annual IEEE Symposium on
ISSN
0272-5428
Print_ISBN
978-1-4244-8525-3
Type
conf
DOI
10.1109/FOCS.2010.40
Filename
5671208
Link To Document