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Cubic Harmonious Labeling Of Certain Star and Bistar Graphs
International Journal of Emerging Trends in Science and Technology, 2017 openaire +1 more source
Traditional Chinese Medicine five-tone intelligent diagnosis and treatment system. [PDF]
J Tradit Chin MedJingzhi Z +8 more
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Culturally inclusive teaching in diverse classroom settings in Chinese kindergartens: a qualitative "context-methods-outcomes" model. [PDF]
Front PsycholLi Y, Fan M.
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Odd harmonious labeling of some new families of graphs
Odd harmonious labeling of some new families of graphsopenaire
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On Properly Odd Harmonious Labeling of Graphs
2022 IEEE 20th Jubilee International Symposium on Intelligent Systems and Informatics (SISY), 2022Yegnannarayanan Venkataraman +3 more
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Harmonious labelings of windmill graphs and related graphs
Journal of Graph Theory, 1982AbstractA strongly harmonious labeling is the nonmodular version of a harmonious labeling. The windmill graph K(t)n is the graph consisting of t copies of the complete graph Kn with a vertex in common. It is shown that, for t ≥ 1, K(t)n is strongly harmonious and so harmonious by drawing on partitions already available from the construction of cyclic ...
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Odd harmonious labeling of amalgamation of star graph
AIP Conference Proceedings, 2022Emiliana Asumpta +2 more
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Harmonious labeling graph of a group
AIP Conference Proceedings, 2021Let G be a commutative group. The Harmonious labeling graph G is the undirected graph with vertex set G and two distinct vertices a and b are adjacent if a + b is a mod m in G. In this paper, we present a study of results on the Harmonious labeling graph of f(G) and its generalizations.
M. Angeline Ruba +2 more
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Bitopological Harmonious Labeling of Some Star Related Graphs
International Journal of Research and Innovation in Applied ScienceBitopological harmonious labeling for a graph G=(V(G),E(G)) with n vertices, is an injective function f:V(G)→2^X, where X is any non – empty set such that |X|=m,m< n and {f(V(G))} forms a topology on X, that induces an injective function f^*: E(G) → 2^(X^* ), defined by f^* (uv) = f(u)∩f(v) for every uv∈E(G) such that {f^* (E(G))} forms a topology
M. Subbulakshmi +2 more
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