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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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Odd Harmonious Labeling of Some Classes of Cycle Related Graphs
Indian Journal of Public Health Research & Development, 2018A connected graph G = (V, E) of order atleast two, with order and size is called odd harmonious, if there exists an injection f:V → {0, 1, 2,, 2q − 1} such that the induced function f*:E → {, 3,, 2q1} defined by f*(uv) = [f (u) + f (v)], uv ∈ E is a bijection. Then f is called odd harmonious labeling of G.
J. Renuka, P. Balaganesan
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Computation of even-odd harmonious labeling of graphs obtained by graph operations
AIP Conference Proceedings, 2019Let G(V, E) be a graph with order p and size q. The graph G is called as an even-odd harmonious graph if there exists an 1-1 map f:V → {1, 3, 5, …, 2p − 1} and a bijective map f∗:E → {0, 2, …, 2(q − 1)} such that f∗(e = uv) = (f(u) + f(v))(mod 2q). This computation of assigning the numbers to the vertices and edges of G is called an even-odd harmonious
M. Kalaimathi, B. J. Balamurugan
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Odd harmonious labeling of amalgamation of star graph
AIP Conference Proceedings, 2022Emiliana Asumpta +2 more
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Odd harmonious labeling of some family of snake graphs
AIP Conference Proceedings, 2022Emiliana Asumpta +2 more
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Odd-harmonious labeling of hedge graph and graph K′(2, nC4)
AIP Conference ProceedingsRegina Ayu Rahmawati, null Purwanto
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