標題: A study of total relative Displacements of permutations in paths and cycles
作者: Cheng, Kai-Chung
Fu, Hung-Lin
Chiang, Nam-Po
Tzeng, Chien-Kuo
應用數學系
Department of Applied Mathematics
公開日期: 1-Mar-2008
摘要: Let G = (V, E) be a connected graph and let phi be a permutation of V. The total relative displacement of the permutation phi in G is delta(phi) (G) = Sigma ({x,y}CV) vertical bar d(x,y) - d(phi(x),phi(y))vertical bar, where d(x, y) means the distance between x and y in G, i.e., the length of a shortest path between x and y. A permutation phi which attains the minimum value of non-zero value of delta(phi)(G) is referred to as a near-automarphism of G and a permutation phi which attains the maximum value of delta(phi)(G) is referred to as a chaotic mapping of G. In this paper, we study the maximum value of delta(phi) (G) among all permutations in paths and cycles.
URI: http://hdl.handle.net/11536/9639
ISSN: 0315-3681
期刊: UTILITAS MATHEMATICA
Volume: 75
Issue: 
起始頁: 139
結束頁: 157
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