论文信息 - Some order dimension bounds for communication complexity problems

Some order dimension bounds for communication complexity problems

SummaryWe associate with a general (0, 1)-matrixM an ordered setP(M) and derive lower and upper bounds for the deterministic communication complexity ofM in terms of the order dimension ofP(M). We furthermore consider the special class of communication matricesM obtained as cliques vs. stable sets incidence matrices of comparability graphsG. We bound their complexity byO((logd)·(logn)), wheren is the number of nodes ofG andd is the order dimension of an orientation ofG. In this special case, our bound is shown to improve other well-known bounds obtained for the general cliques vs. stable set problem.

Ulrich Faigle | Walter Kern | U. Faigle | W. Kern

[1] L. Lovász. Combinatorial problems and exercises , 1979 .

[2] Mihalis Yannakakis,et al. Expressing combinatorial optimization problems by linear programs , 1991, STOC '88.

[3] Ben Dushnik,et al. Partially Ordered Sets , 1941 .

[4] R. P. Dilworth,et al. A DECOMPOSITION THEOREM FOR PARTIALLY ORDERED SETS , 1950 .

[5] I. Rival. Graphs and Order , 1985 .

[6] Kurt Mehlhorn,et al. Las Vegas is better than determinism in VLSI and distributed computing (Extended Abstract) , 1982, STOC '82.

[7] Andrew Chi-Chih Yao,et al. Some complexity questions related to distributive computing(Preliminary Report) , 1979, STOC.

[8] Douglas B. West,et al. Parameters of Partial Orders and Graphs: Packing, Covering, and Representation , 1985 .

[9] Alfred V. Aho,et al. On notions of information transfer in VLSI circuits , 1983, STOC.