Edge metric dimension of some classes of circulant graphs

Pub Date : 2020-12-01 DOI:10.2478/auom-2020-0032
M. Ahsan, Z. Zahid, Sohail Zafar
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引用次数: 6

Abstract

Abstract Let G = (V (G), E(G)) be a connected graph and x, y ∈ V (G), d(x, y) = min{ length of x − y path } and for e ∈ E(G), d(x, e) = min{d(x, a), d(x, b)}, where e = ab. A vertex x distinguishes two edges e1 and e2, if d(e1, x) ≠ d(e2, x). Let WE = {w1, w2, . . ., wk} be an ordered set in V (G) and let e ∈ E(G). The representation r(e | WE) of e with respect to WE is the k-tuple (d(e, w1), d(e, w2), . . ., d(e, wk)). If distinct edges of G have distinct representation with respect to WE, then WE is called an edge metric generator for G. An edge metric generator of minimum cardinality is an edge metric basis for G, and its cardinality is called edge metric dimension of G, denoted by edim(G). The circulant graph Cn(1, m) has vertex set {v1, v2, . . ., vn} and edge set {vivi+1 : 1 ≤ i ≤ n−1}∪{vnv1}∪{vivi+m : 1 ≤ i ≤ n−m}∪{vn−m+ivi : 1 ≤ i ≤ m}. In this paper, it is shown that the edge metric dimension of circulant graphs Cn(1, 2) and Cn(1, 3) is constant.
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几类循环图的边度量维数
摘要设G = (V (G), E(G))是连通图,且x, y∈V (G), d(x, y) = min{x - y路径的长度},对于E∈E(G), d(x, E) = min{d(x, a), d(x, b)},其中E = ab。如果d(e1, x)≠d(e2, x),则顶点x区分两条边e1和e2。设WE = {w1, w2,…,wk}是V (G)中的有序集合,设E∈E(G)。e对WE的表示r(e | WE)是k元组(d(e, w1), d(e, w2),…,d(e, wk))。如果G的不同边对WE有不同的表示,则WE称为G的边度量生成器。最小基数的边度量生成器是G的边度量基,其基数称为G的边度量维数,用edim(G)表示。循环图Cn(1, m)具有顶点集{v1, v2,…,vn}和边集{vivi+1: 1≤i≤n - 1}∪{vnv1}∪{vivi+m: 1≤i≤n - m}∪{vn - m+ivi: 1≤i≤m}。本文证明了循环图Cn(1,2)和Cn(1,3)的边度量维是常数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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