標題: | Mutually independent bipanconnected property of hypercube |
作者: | Shih, Yuan-Kang Tan, Jimmy J. M. Hsu, Lih-Hsing 資訊工程學系 Department of Computer Science |
關鍵字: | Hypercubes;Panconnected;Mutually independent |
公開日期: | 15-十二月-2010 |
摘要: | A graph is denoted by G with the vertex set V(G) and the edge set E(G). A path P = < v(0), v(1),..., v(m)> is a sequence of adjacent vertices. Two paths with equal length P(1) = < u(1), u(2),..., u(m)> and P(2) = < v(1), v(2),..., v(m)> from a to b are independent if u(1) = v(1) = a, u(m) = v(m) = b, and u(i) not equal v(i) for 2 <= i 6 <= m - 1. Paths with equal length {P(i)}(i-1)(n) from a to b are mutually independent if they are pairwisely independent. Let u and v be two distinct vertices of a bipartite graph G, and let l be a positive integer length, d(G)(u, v) <= l <= vertical bar V(G) - 1 vertical bar with (l - d(G)(u, v)) being even. We say that the pair of vertices u, v is ( m, l)- mutually independent bipanconnected if there exist m mutually independent paths {P(i)(l)}(i-1)(m) with length l from u to v. In this paper, we explore yet another strong property of the hypercubes. We prove that every pair of vertices u and v in the n-dimensional hypercube, with d(Qn) (u, v) >= n - 1, is (n - 1,l)-mutually independent bipanconnected for every l; d(Qn) (u, v) <= l <= vertical bar V(Q(n))-1 vertical bar with (l - d(Qn) (u, v)) being even. As for d(Qn) (u, v) <= n - 2, it is also (n - 1,l)-mutually independent bipanconnected if l >= d(Qn) (u, v) + 2, and and is only (l,l)-mutually independent bipanconnected if l = d(Qn)(u, v). (C) 2010 Elsevier Inc. All rights reserved. |
URI: | http://dx.doi.org/10.1016/j.amc.2010.10.008 http://hdl.handle.net/11536/26228 |
ISSN: | 0096-3003 |
DOI: | 10.1016/j.amc.2010.10.008 |
期刊: | APPLIED MATHEMATICS AND COMPUTATION |
Volume: | 217 |
Issue: | 8 |
起始頁: | 4017 |
結束頁: | 4023 |
顯示於類別: | 期刊論文 |