Ordered Yao graphs: maximum degree, edge density, and clique numbers

Abstract

For a positive integer k and an ordered set of n points in the plane, define its k-sector ordered Yao graphs as follows. Divide the plane around each point into k equal sectors and draw an edge from each point to its closest predecessor in each of the k sectors. We analyze several natural parameters of these graphs. Our main results are as follows: I Let dk(n) be the maximum integer so that for every n-element point set in the plane, there exists an order such that the corresponding k-sector ordered Yao graph has maximum degree at least dk(n). We show that dk(n)=n-1 if k=4 or k 6, and provide some estimates for the remaining values of k. Namely, we show that d1(n) = Θ( n ); 12(n-1) d3(n) 5n6-1; 23(n-1) d5(n) n-1; II Let ek(n) be the minimum integer so that for every n-element point set in the plane, there exists an order such that the corresponding k-sector ordered Yao graph has at most ek(n) edges. Then ek(n)=k2· n-o(n). III Let wk be the minimum integer so that for every point set in the plane, there exists an order such that the corresponding k-sector ordered Yao graph has clique number at most wk. Then k2 wk k2+1. All the orders mentioned above can be constructed effectively.