Keywords:-
Article Content:-
Abstract
Let G be a simple, finite, connected, undirected, non-trivial graph with vertices and edges. be the vertex set and be the edge set of Let where a and is an injective function. If for each edge defined by is a bijective function then the function is called arithmetic sequential graceful labeling. The graph with arithmetic sequential graceful labeling is called arithmetic sequential graceful graph. In this paper, arithmetic sequential graceful labeling for some special graphs were studied.
References:-
References
Barnes, J. A., & Harary, F. (1983). Graph theory in network analysis. Social networks, 5(2), 235-244.
Rosa, A. (1967). On certain valuations of the vertices of a graph, Theory of Graphs (Internat. Symposium, Rome, July 1966).
Gallian J A, “A dynamic survey of Graph labeling”, The Electronic Journal of Combinatorics, (2020), pp. 77-81.
V J Kaneria1 , Meera Meghpara , H M Makadia Pasaribu,Graceful Labeling For Open Star of Graphs. International Journal Of Mathematics And Statistics Invention (IJMSI) E-ISSN: 2321 – 4767 P-ISSN: 2321 – 4759
V J Kaneria1 , Meera Meghpara , H M Makadia Pasaribu, Graceful labeling for grid related graphs, International Journal of Mathematics and Soft Computing, Vol.5, No.1 (2015), 111 - 117.
DOI:10.26708/IJMSC.2015.1.5.13
V. J. Kaneria, H. M. Makadia and M. M. Jariya, Graceful labeling for cycle of graphs, Int. J. of Math. Res., vol-6 (2), (2014) pp. 135-139.
S. K. Vaidya, S. Srivastav, V. J. Kaneria and G. V. Ghodasara, Cordial and 3 − equitable labeling of star of a cycle, Mathematics Today 24 (2008), pp. 54 − 64.
V. J. Kaneria, H. M. Makadia, Graceful Labeling for Step Grid Graph, Journal Of Advances In Mathematics, 2014(vol.9,No.5)
DOI: https://doi.org/10.24297/jam.v9i5.2335
Sumathi P, Geetha Ramani G (2022) Arithmetic Sequential Graceful Labeling on Star Related Graphs. Indian Journal of Science and Technology 15(44): 2356-2362. https://doi.org/ 10.17485/IJST/v15i44.1863