论文信息 - Independence and chromatic densities of graphs

Independence and chromatic densities of graphs

We consider graph densities in countably inflnite graphs. The independence density of a flnite graph G of order n is its proportion of independent sets to all subsets of vertices, while the chromatic density is its proportion of proper n-colourings to all mappings from vertices of G to f1;2;:::;ng. For both densities, we extend their deflnition to countable graphs via limits of chains of flnite graphs. We show that independence densities exist for all chains, and are unique regardless of which limiting chain is used. We prove that independence densities are always rational; in fact, the closure of the set of possible values is contained in the rationals. In contrast, we show that the inflnite random graph contains chains realizing all real numbers in [0;1] as a chromatic density.

Anthony Bonato | Jason I. Brown | Paweł Prałat | Graeme Kemkes

[1] Reinhard Diestel,et al. Graph Theory , 1997 .

[2] Paul D. Seymour,et al. The roots of the independence polynomial of a clawfree graph , 2007, J. Comb. Theory B.

[3] Anders Sune Pedersen,et al. BOUNDS ON THE NUMBER OF VERTEX INDEPENDENT SETS IN A GRAPH , 2006 .

[4] R. Merrifield,et al. Topological methods in chemistry , 1989 .

[5] Anthony Bonato,et al. A course on the Web graph , 2008 .

[6] Jason I. Brown,et al. Roots of Independence Polynomials of Well Covered Graphs , 2000 .

[7] Zoltán Füredi,et al. The number of maximal independent sets in connected graphs , 1987, J. Graph Theory.

[8] P. Erdos,et al. Asymmetric graphs , 1963 .

[9] V. Linek,et al. Bipartite graphs can have any number of independent sets , 1989, Discret. Math..

[10] A. Brandstädt,et al. Graph Classes: A Survey , 1987 .

[11] Bruce E. Sagan,et al. A Note on Independent Sets in Trees , 1988, SIAM J. Discret. Math..

[12] Norman Biggs. Algebraic Graph Theory: Index , 1974 .

[13] Jason I. Brown,et al. On the Location of Roots of Independence Polynomials , 2004 .

[14] Anthony Bonato,et al. The cop density of a graph , 2007, Contributions Discret. Math..

[15] Aldo Procacci,et al. Potts Model on Infinite Graphs and the Limit of Chromatic Polynomials , 2002 .

[16] László Lovász,et al. Limits of dense graph sequences , 2004, J. Comb. Theory B.