Independent Spanning Trees of 2-Chordal Rings

抄録

Two spanning trees T₁,T₂ of a graph G = (V,E) are independent if they are rooted at the same vertex, say r, and for each vertex v ∈ V, the path from r to v in T₁ and the path from r to v in T₂ have no common vertices and no common edges except for r and v. In general, spanning trees T₁,T₂,…,T_k of a graph G = (V,E) are independent if they are pairwise independent. A graph G = (V,E) is called a 2-chordal ring and denoted by CR(N,d₁,d₂), if V = {0,1,…,N-1} and E = {(u,v)|[v-u]_N = 1 or [v-u]_N = d₁ or [v-u]_N = d₂, 2 ≤ d₁ < d₂ ≤ N/2}. CR(N,d₁,N/2) is 5-connected if N ≥ 8 is even and d₁ ≠ N/2-1. We give an algorithm to construct 5 independent spanning trees of CR(N,d₁,N/2),N ≥ 8 is even and 2 ≤ d₁ ≤ ⌈N/4⌉.