Rainbow Hamilton Cycles in Random Geometric Graphs

Abstract

Let X1,X2,…,Xn be chosen independently and uniformly at random from the unit d-dimensional cube [0,1]d. Let r be given and let X=\X1,X2,…,Xn\. The random geometric graph G=G X,r has vertex set X and an edge XiXj whenever \|Xi-Xj\|≤ r. We show that if each edge of G is colored independently from one of n+o(n) colors and r has the smallest value such that G has minimum degree at least two, then G contains a rainbow Hamilton cycle a.a.s.