Sparse universal graphs

For every n, we describe an explicit construction of a graph on n vertices with at most O(n2-ɛ) edges, for ɛ = 0.133..., that contains every graph on n vertices with maximum degree 3 as a subgraph. It is easy to see that each such graph must have at least Ω(n4/3) edges. We also show that the minimum number of edges of a graph that contains every graph with n edges as a subgraph is Δ(n2/(log2n)). This improves a result of Babai, Chung, Erdos, Graham and Spencer (Ann. Discrete Math. 12 (1982) 21-26).

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

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

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

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

[5]  Noga Alon,et al.  The Probabilistic Method , 2015, Fundamentals of Ramsey Theory.

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