Probabilistic graph-coloring in bipartite and split graphs

被引:3
|
作者
Bourgeois, N. [1 ,3 ]
Della Croce, F. [2 ]
Escoffier, B. [1 ,3 ]
Murat, C. [1 ,3 ]
Paschos, V. Th. [1 ,3 ]
机构
[1] LAMSADE, CNRS, UMR 7024, Paris, France
[2] Politecn Torino, DAI, Turin, Italy
[3] Univ Paris 09, Paris, France
来源
JOURNAL OF COMBINATORIAL OPTIMIZATION | 2009年 / 17卷 / 03期
关键词
Probabilistic optimization; Approximation algorithms; Graph coloring; COMBINATORIAL OPTIMIZATION PROBLEMS; TRAVELING SALESMAN PROBLEM; APPROXIMATION ALGORITHMS; PRIORI OPTIMIZATION;
D O I
10.1007/s10878-007-9112-2
中图分类号
TP39 [计算机的应用];
学科分类号
081203 ; 0835 ;
摘要
We revisit in this paper the stochastic model for minimum graph-coloring introduced in (Murat and Paschos in Discrete Appl. Math. 154:564-586, 2006), and study the underlying combinatorial optimization problem (called probabilistic coloring) in bipartite and split graphs. We show that the obvious 2-coloring of any connected bipartite graph achieves standard-approximation ratio 2, that when vertex-probabilities are constant probabilistic coloring is polynomial and, finally, we propose a polynomial algorithm achieving standard-approximation ratio 8/7. We also handle the case of split graphs. We show that probabilistic coloring is NP-hard, even under identical vertex-probabilities, that it is approximable by a polynomial time standard-approximation schema but existence of a fully a polynomial time standard-approximation schema is impossible, even for identical vertex-probabilities, unless P=NP. We finally study differential-approximation of probabilistic coloring in both bipartite and split graphs.
引用
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页码:274 / 311
页数:38
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