Non-crossing Monotone Paths and Binary Trees in Edge-ordered Complete Geometric Graphs

Abstract

An edge-ordered graph is a graph with a total ordering of its edges. A path P=v1v2… vk in an edge-ordered graph is called increasing if (vivi+1) > (vi+1vi+2) for all i = 1,…,k-2; it is called decreasing if (vivi+1) < (vi+1vi+2) for all i = 1,…,k-2. We say that P is monotone if it is increasing or decreasing. A rooted tree T in an edge-ordered graph is called monotone if either every path from the root of to a leaf is increasing or every path from the root to a leaf is decreasing. Let G be a graph. In a straight-line drawing D of G, its vertices are drawn as different points in the plane and its edges are straight line segments. Let α(G) be the maximum integer such that every edge-ordered straight-line drawing of G %under any edge labeling contains a monotone non-crossing path of length α(G). Let τ(G) be the maximum integer such that every edge-ordered straight-line drawing of G %under any edge labeling contains a monotone non-crossing complete binary tree of size τ(G). In this paper we show that α(Kn) = ( n), α(Kn) = O( n), τ(Kn) = ( n) and τ(Kn) = O(n n).