Resolving domination number of helm graph and it’s operation

Hayyu, A. N.; Dafik, Dafik; Tirta, I Made; Adawiyah, Robiatul; Prihandini, R. M.

doi:10.1088/1742-6596/1465/1/012022

Cited by 8 publications

(6 citation statements)

References 8 publications

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“…To construct the theorem of this case, firstly we show the lower bound of γ rst (H n ) for n = 3 and n = 4 by Lemma 1. Based on [14] dim(H n ) = n, n ≤ 3, and based on Theorem 1 γ st (H n ) = n, for n = 3 and n = 4, so we have γ rst (H n ) ≥ max{γ st (H n ), dim(H n )} = max{n, n} = n. Secondly, we suppose D s = {xi : 1 ≤ i ≤ n} as a resolving strong dominating set of (H n ). We show the representations of all vertices of H 3 and H 4 which require the resolving strong dominating set in the following.…”

Section: Helm Graph (H N )mentioning

confidence: 99%

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On the resolving strong domination number of some wheel related graphs

Humaizah

Dafik

Kristiana

et al. 2022

J. Phys.: Conf. Ser.

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This study aims to analyse the resolving strong dominating set. This concept combinations of two notions, they are metric dimension and strong domination set. By a resolving strong domination set, we mean a set D s ⊂ V(G) which satisfies the definition of strong dominating set as well as resolving set. The resolving strong domination number of graph G, denoted by γrst (G), is the minimum cardinality of resolving strong dominating set of G. In this paper, we determine the resolving strong domination number of some wheel related graphs, namely helm graph Hn , gear graph Gn , and flower graph Fln . Through this paper, we will use the notations γst (G) and dim(G) which show the strong domination and dimension numbers.

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Section: Helm Graph (H N )mentioning

confidence: 99%

“…Same with the proof of Case 1, firstly we show the lower bound of γ rst (H n ) for n otherwise by Lemma 1. Based on Hayyu et al [14] dim(H n ) = n, n ≤ 3, and based on Theorem 3.…”

Section: Helm Graph (H N )mentioning

confidence: 99%

On the resolving strong domination number of some wheel related graphs

Humaizah

Dafik

Kristiana

et al. 2022

J. Phys.: Conf. Ser.

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“…Another example of an interactive online tool is the common online data analysis platform (CODAP), which has been integrated into the teaching of machine learning and other data science topics [28]. Interactive activities embedded in online applets facilitate students learning at their own pace, and self-discovery has been shown to improve students' understanding and ability to retain information [29,30].…”

Section: Introductionmentioning

confidence: 99%

Integrating Ecological Forecasting into Undergraduate Ecology Curricula with an R Shiny Application-Based Teaching Module

et al. 2022

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Ecological forecasting is an emerging approach to estimate the future state of an ecological system with uncertainty, allowing society to better manage ecosystem services. Ecological forecasting is a core mission of the U.S. National Ecological Observatory Network (NEON) and several federal agencies, yet, to date, forecasting training has focused on graduate students, representing a gap in undergraduate ecology curricula. In response, we developed a teaching module for the Macrosystems EDDIE (Environmental Data-Driven Inquiry and Exploration; MacrosystemsEDDIE.org) educational program to introduce ecological forecasting to undergraduate students through an interactive online tool built with R Shiny. To date, we have assessed this module, “Introduction to Ecological Forecasting,” at ten universities and two conference workshops with both undergraduate and graduate students (N = 136 total) and found that the module significantly increased undergraduate students’ ability to correctly define ecological forecasting terms and identify steps in the ecological forecasting cycle. Undergraduate and graduate students who completed the module showed increased familiarity with ecological forecasts and forecast uncertainty. These results suggest that integrating ecological forecasting into undergraduate ecology curricula will enhance students’ abilities to engage and understand complex ecological concepts.

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“…The resolving domination number is its minimum cardinality and denoted by γ r G. A resolving dominating set of graph G is a subset Y of V (G) which is not only a ominating set of G but also determine every vertex of G by its distance representation in respect to every vertex in Y . We refer to [1,21,23,34] for some previous results. Several types of resolving domination number are resolving strong domination number, resolving perfect domination number, and resolving efficient domination number, see [28,24].…”

Section: Introductionmentioning

confidence: 99%

On resolving efficient domination number of path and comb product of special graph

Kusumawardani

Dafik

Kurniawati

et al. 2022

J. Phys.: Conf. Ser.

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We use finite, connected, and undirected graph denoted by G. Let V (G) and E(G) be a vertex set and edge set respectively. A subset D of V (G) is an efficient dominating set of graph G if each vertex in G is either in D or adjoining to a vertex in D. A subset W of V (G) is a resolving set of G if any vertex in G is differently distinguished by its representation respect of every vertex in an ordered set W. Let W = {w 1, w 2, w 3, …, wk } be a subset of V (G). The representation of vertex υ ∈ G in respect of an ordered set W is r(υ|W) = (d(υ, w 1),d(υ, w 2), …, d(υ, wk )). The set W is called a resolving set of G if r(u|W) ≠ r(υ|W) ∀ u, υ ∈ G. A subset Z of V (G) is called the resolving efficient dominating set of graph G if it is an efficient dominating set and r(u|Z) ≠ r(υ|Z) ∀ u, υ ∈ G. Suppose γre (G) denotes the minimum cardinality of the resolving efficient dominating set. In other word we call a resolving efficient domination number of graphs. We obtained γreG of some comb product graphs in this paper, namely Pm ⊲ Pn , Sm ⊲ Pn , and Km ⊲ Pn .

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Resolving domination number of helm graph and it’s operation

Cited by 8 publications

References 8 publications

On the resolving strong domination number of some wheel related graphs

On the resolving strong domination number of some wheel related graphs

Integrating Ecological Forecasting into Undergraduate Ecology Curricula with an R Shiny Application-Based Teaching Module

On resolving efficient domination number of path and comb product of special graph

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