On The Time Constant for Last Passage Percolation on Complete Graph

Abstract

This paper focuses on the time constant for last passage percolation on complete graph. Let Gn=([n],En) be the complete graph on vertex set [n]=\1,2,…,n\, and i.i.d. sequence \Xe:e∈ En\ be the passage times of edges. Denote by Wn the largest passage time among all self-avoiding paths from 1 to n. First, it is proved that Wn/n converges to constant μ, where μ is called the time constant and coincides with the essential supremum of Xe. Second, when μ<∞, it is proved that the deviation probability P(Wn/n≤ μ-x) decays as fast as e-(n2), and as a corollary, an upper bound for the variance of Wn is obtained. Finally, when μ=∞, lower and upper bounds for Wn/n are given.