Local Super Antimagic Total Labeling for Vertex Coloring of Graphs

Slamin, Slamin; Adiwijaya, Nelly Oktavia; Hasan, Moh.; Dafik, Dafik; Wijaya, Kristiana

doi:10.3390/sym12111843

Cited by 15 publications

(13 citation statements)

References 7 publications

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“…Slamin et al [8] proved the following. If T is a tree on n ≥ 2 vertices with k leaves, then χ slat (T ) ≤ n − k + 1.…”

Section: Introductionmentioning

confidence: 90%

“…We will show that stars are the only trees with χ slat (T ) = 2. In our proof, we provide a labeling different from the one in [8].…”

Section: Characterization Of Trees With χ Slat (T ) =mentioning

confidence: 99%

“…Furthermore, Slamin et al [8] introduced a new variant of the labeling. A super vertex local antimagic total labeling is a bijective map f : From the definition, we can perceive the super vertex local antimagic labeling as a vertex coloring of a graph with some additional conditions.…”

Section: Introductionmentioning

confidence: 99%

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Chromatic number of super vertex local antimagic total labelings of graphs

Hadiputra

Sugeng

Silaban

et al. 2021

EJGTA

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Let G(V, E) be a simple graph and f be a bijection f : V ∪ E → {1, 2, . . . , |V | + |E|} where f (V ) = {1, 2, . . . , |V |}. For a vertex x ∈ V , define its weight w(x) as the sum of labels of all edges incident with x and the vertex label itself. Then f is called a super vertex local antimagic total (SLAT) labeling if for every two adjacent vertices their weights are different. The super vertex local antimagic total chromatic number χ slat (G) is the minimum number of colors taken over all colorings induced by super vertex local antimagic total labelings of G. We classify all trees T that have χ slat (T ) = 2, present a class of trees that have χ slat (T ) = 3, and show that for any positive integer n ≥ 2 there is a tree T with χ slat (T ) = n.

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“…Slamin et al [8] proved the following. If T is a tree on n ≥ 2 vertices with k leaves, then χ slat (T ) ≤ n − k + 1.…”

Section: Introductionmentioning

confidence: 90%

“…We will show that stars are the only trees with χ slat (T ) = 2. In our proof, we provide a labeling different from the one in [8].…”

Section: Characterization Of Trees With χ Slat (T ) =mentioning

confidence: 99%

See 1 more Smart Citation

Chromatic number of super vertex local antimagic total labelings of graphs

Hadiputra

Sugeng

Silaban

et al. 2021

EJGTA

View full text Add to dashboard Cite

show abstract

“…To tackle these problems, different coloring schemes have been proposed: the scheme based on distances in [44], the scheme based on templates in [45], the scheme based on adjacencies in [46], the scheme based on heuristics in [47] and the scheme based on pseudo-randomness (with constrains, Grundy and color-dominating) in [48]. The properties of the colorings have been studied in [49] and the counting of distinguishing (symmetry breaking) colorings with k colors in [50].…”

Section: Related Researchmentioning

confidence: 99%

Figures of Graph Partitioning by Counting, Sequence and Layer Matrices

2021

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A series of counting, sequence and layer matrices are considered precursors of classifiers capable of providing the partitions of the vertices of graphs. Classifiers are given to provide different degrees of distinctiveness for the vertices of the graphs. Any partition can be represented with colors. Following this fundamental idea, it was proposed to color the graphs according to the partitions of the graph vertices. Two alternative cases were identified: when the order of the sets in the partition is relevant (the sets are distinguished by their positions) and when the order of the sets in the partition is not relevant (the sets are not distinguished by their positions). The two isomers of C28 fullerenes were colored to test the ability of classifiers to generate different partitions and colorings, thereby providing a useful visual tool for scientists working on the functionalization of various highly symmetrical chemical structures.

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“…Nowadays, many researchers are working on graphical solutions and pathfinding to resolve crucial application issues [21][22][23][24][25][26][27]. Dijkstra's algorithm is used for finding the solution to the shortest path problem in multi-destination nodes [28].…”

Section: Related Workmentioning

confidence: 99%

An Efficient Shortest Path Algorithm: Multi-Destinations in an Indoor Environment

et al. 2021

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The shortest path-searching with the minimal weight for multiple destinations is a crucial need in an indoor applications, especially in supermarkets, warehouses, libraries, etc. However, when it is used for multiple item searches, its weight becomes higher as it searches only the shortest path between the single sources to each destination item separately. If the conventional Dijkstra algorithm is modified to multi-destination mode then the weight is decreased, but the output path is not considered as the real shortest path among multiple destinations items. Our proposed algorithm is more efficient for finding the shortest path among multiple destination items with minimum weight, compared to the single source single destination and modified multi-destinations of Dijkstra’s algorithm. In this research, our proposed method has been validated by real-world data as well as by simulated random solutions. Our advancement is more applicable in indoor environment applications based on multiple items or destinations searching.

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Local Super Antimagic Total Labeling for Vertex Coloring of Graphs

Cited by 15 publications

References 7 publications

Chromatic number of super vertex local antimagic total labelings of graphs

Chromatic number of super vertex local antimagic total labelings of graphs

Figures of Graph Partitioning by Counting, Sequence and Layer Matrices

An Efficient Shortest Path Algorithm: Multi-Destinations in an Indoor Environment

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