Sparse universal graphs for bounded-degree graphs

Let ℋ be a family of graphs. A graph T is ℋ-universal if it contains a copy of each Heℋ as a subgraph. Let ℋ(k,n) denote the family of graphs on n vertices with maximum degree at most k. For all positive integers k and n, we construct an ℋ(k,n)-universal graph T with Ok(n2-2/klog4/kn) edges and exactly n vertices. The number of edges is almost as small as possible, as Ω(n2-2/k) is a lower bound for the number of edges in any such graph. The construction of T is explicit, whereas the proof of universality is probabilistic and is based on a novel graph decomposition result and on the properties of random walks on expanders. © 2006 Wiley Periodicals, Inc. Random Struct. Alg., 2007

[1]  Fan Chung Graham,et al.  On graphs which contain all small trees , 1978, J. Comb. Theory, Ser. B.

[2]  Ronald L. Graham,et al.  ON UNIVERSAL GRAPHS , 1979 .

[3]  R. Graham,et al.  On graphs which contain all sparse graphs , 1982 .

[4]  Arnold L. Rosenberg,et al.  Perfect Storage Representations for Families of Data Structures , 1983 .

[5]  Ronald L. Graham,et al.  On Universal Graphs for Spanning Trees , 1983 .

[6]  Charles E. Leiserson,et al.  How to assemble tree machines , 1984 .

[7]  N. Alon Eigenvalues and expanders , 1986, Comb..

[8]  L. Lovász Matching Theory (North-Holland mathematics studies) , 1986 .

[9]  Joel Friedman,et al.  Expanding graphs contain all small trees , 1987, Comb..

[10]  Arnold L. Rosenberg,et al.  Universal Graphs for Bounded-Degree Trees and Planar Graphs , 1989, SIAM J. Discret. Math..

[11]  D. West Introduction to Graph Theory , 1995 .

[12]  Michael R. Capalbo,et al.  Small universal graphs , 1999, STOC '99.

[13]  Michael R. Capalbo Small Universal Graphs for Bounded-Degree Planar Graphs , 1999, SODA '99.

[14]  Yoshiharu Kohayakawa,et al.  Universality and tolerance , 2000, Proceedings 41st Annual Symposium on Foundations of Computer Science.

[15]  Yoshiharu Kohayakawa,et al.  Near-optimum Universal Graphs for Graphs with Bounded Degrees , 2001, RANDOM-APPROX.

[16]  Noga Alon,et al.  Sparse universal graphs , 2002 .

[17]  Joel Friedman,et al.  A proof of Alon's second eigenvalue conjecture and related problems , 2004, ArXiv.