Near-Optimal Induced Universal Graphs for Bounded Degree Graphs

Abstract

A graph U is an induced universal graph for a family F of graphs if every graph in F is a vertex-induced subgraph of U. For the family of all undirected graphs on n vertices Alstrup, Kaplan, Thorup, and Zwick [STOC 2015] give an induced universal graph with O\!(2n/2) vertices, matching a lower bound by Moon [Proc. Glasgow Math. Assoc. 1965]. Let k= D/2 . Improving asymptotically on previous results by Butler [Graphs and Combinatorics 2009] and Esperet, Arnaud and Ochem [IPL 2008], we give an induced universal graph with O\!(k2kk!nk ) vertices for the family of graphs with n vertices of maximum degree D. For constant D, Butler gives a lower bound of \!(nD/2). For an odd constant D≥ 3, Esperet et al. and Alon and Capalbo [SODA 2008] give a graph with O\!(nk-1D) vertices. Using their techniques for any (including constant) even values of D gives asymptotically worse bounds than we present. For large D, i.e. when D = (3 n), the previous best upper bound was n D/2 nO(1) due to Adjiashvili and Rotbart [ICALP 2014]. We give upper and lower bounds showing that the size is n/2 D/2 2O(D). Hence the optimal size is 2O(D) and our construction is within a factor of 2O(D) from this. The previous results were larger by at least a factor of 2(D). As a part of the above, proving a conjecture by Esperet et al., we construct an induced universal graph with 2n-1 vertices for the family of graphs with max degree 2. In addition, we give results for acyclic graphs with max degree 2 and cycle graphs. Our results imply the first labeling schemes that for any D are at most o(n) bits from optimal.