Large induced distance matchings in certain sparse random graphs

Abstract

For a fixed integer k≥slant 2, let G∈ G(n,p) be a simple connected graph on n→∞ vertices with the expected degree d=np satisfying d≥slant c and dk-1= o(n) for some large enough constant c. We show that the asymptotical size of any maximal collection of edges M in G such that no two edges in M are within distance k, which is called a distance k-matching, is between (k-1)n d4dk-1 and k n d2dk-1. We also design a randomized greedy algorithm to generate one large distance k-matching in G with asymptotical size kn d4dk-1. Our results partially generalize the results on the size of the largest distance k-matchings from the case k=2 or d=c for some large constant c.