The cube graph Q_n is the skeleton of the n-dimensional cube. It is an
n-regular graph on 2^n vertices. The Ramsey number r(Q_n, K_s) is the minimum N
such that every graph of order N contains the cube graph Q_n or an independent
set of order s. Burr and Erdos in 1983 asked whether the simple lower bound
r(Q_n, K_s) >= (s-1)(2^n - 1)+1 is tight for s fixed and n sufficiently large.
We make progress on this problem, obtaining the first upper bound which is
within a constant factor of the lower bound.Comment: 26 page

Conlon, David

Fox, Jacob

Lee, Choongbum

Sudakov, Benny

COMBINATORICA

English

arXiv

The cube graph Q[subscript n] is the skeleton of the n-dimensional cube. It is an n-regular graph on 2[superscript n] vertices. The Ramsey number r(Q[subscript n] ;K[subscript s]) is the minimum N such that every graph of order N contains the cube graph Q[subscript n] or an independent set of order s. In 1983, Burr and Erdős asked whether the simple lower bound r(Q[subscript n] ;K[subscript s] )≥(s−1)(2[superscript n] −1)+1 is tight for s fixed and n sufficiently large. We make progress on this problem, obtaining the first upper bound which is within a constant factor of the lower bound.Swiss National Science Foundation (SNSF grant 200021-149111)United States-Israel Binational Science FoundationSamsung (Firm) (Scholarship)Royal Society (Great Britain) (University Research Fellowship)David & Lucile Packard Foundation (Fellowship)Simons Foundation (Fellowship)NEC Corporation (MIT NEC Corp. award)National Science Foundation (U.S.) (NSF grant DMS-1069197

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Ramsey numbers of cubes versus cliques

http://dspace.mit.edu/bitstream/1721.1/92844/1/Fox_Ramsey%20numbers.pdf

Ramsey numbers of cubes versus cliques

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