English

Rainbow Connectivity of Sparse Random Graphs

Combinatorics 2012-10-03 v3 Discrete Mathematics Data Structures and Algorithms

Abstract

An edge colored graph GG is rainbow edge connected if any two vertices are connected by a path whose edges have distinct colors. The rainbow connectivity of a connected graph GG, denoted by rc(G)rc(G), is the smallest number of colors that are needed in order to make GG rainbow connected. In this work we study the rainbow connectivity of binomial random graphs at the connectivity threshold p=logn+\omnp=\frac{\log n+\om}{n} where \om=\om(n)\om=\om(n)\to\infty and \om=o(logn){\om}=o(\log{n}) and of random rr-regular graphs where r3r \geq 3 is a fixed integer. Specifically, we prove that the rainbow connectivity rc(G)rc(G) of G=G(n,p)G=G(n,p) satisfies rc(G)max{Z1,diameter(G)}rc(G) \sim \max\set{Z_1,diameter(G)} with high probability (\whp). Here Z1Z_1 is the number of vertices in GG whose degree equals 1 and the diameter of GG is asymptotically equal to \diam\diam \whp. Finally, we prove that the rainbow connectivity rc(G)rc(G) of the random rr-regular graph G=G(n,r)G=G(n,r) satisfies rc(G)=O(log2n)rc(G) =O(\log^2{n}) \whp.

Keywords

Cite

@article{arxiv.1201.4603,
  title  = {Rainbow Connectivity of Sparse Random Graphs},
  author = {Alan Frieze and Charalampos E. Tsourakakis},
  journal= {arXiv preprint arXiv:1201.4603},
  year   = {2012}
}

Comments

17 pages, 4 figures Accepted at APPROX-RANDOM'12

R2 v1 2026-06-21T20:08:11.572Z