The Connected Domination and Tree Domination of  \(P(n,k)\) for \(k = 1,2, \lfloor n/2 \rfloor\)

Chengye, Zhao; Yuansheng, Yang; Linlin, Sun; Feilong, Cao

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Ars Combinatoria

Volume 101
Pages: 467-479

Research article

The Connected Domination and Tree Domination of \(P(n,k)\) for \(k = 1,2, \lfloor n/2 \rfloor\)

^¹,², ^², ^², ^¹

¹College of Science, China Jiliang University Hangzhou , 310018, P. R. China

²Department of Computer Science, Dalian University of Technology Dalian, 116024, P. R. China

Published: 31/07/2011

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Abstract

Let \(\gamma_c(G)\) be the connected domination number of \(G\) and \(\gamma_{tr}(G)\) be the tree domination number of \(G\). In this paper, we study the generalized Petersen graphs \(P(n,k)\), prove \(\gamma_c(P(n, k)) = \gamma_{tr}(P(n, k))\) and show their exact values for \(k = 1, 2, \ldots, \lfloor n/2 \rfloor\).

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Ars Combinatoria

The Connected Domination and Tree Domination of \(P(n,k)\) for \(k = 1,2, \lfloor n/2 \rfloor\)

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