References
- Abhishek, K. (2013). Set-valued graphs-II. Journal of Fuzzy Set Valued Analysis, 2013, 1–16. doi:10.5899/2013/jfsva-00149.
- Acharya, B. D. (1983). Set-valuations and their applications, MRI Lecture notes in Applied Mathematics (Vol. 2). Allahabad: The Mehta Research Institute of Mathematics and Mathematical Physics.
- Acharya, B. D. (2001). Set-indexers of a graph and set-graceful graphs. Bulletin of The Allahabad Mathematical Society, 16, 1–23.
- Acharya, B. D., & Hegde, S. M. (1985). Set-sequential graphs. National Academy Science Letters, 8, 387–390.
- Acharya, B. D., Germina, K. A., Abhishek, K., & Slater, P. J. (2012). Some new results on set-graceful and set- sequential graphs. Journal of Combinatorics, Information and System Sciences, 37, 145–155.
- Acharya, B. D., Germina, K. A., Princy, K. L., & Rao, S. B. (2008). On set-valuations of graphs. B. D. Acharya, S. Arumugam, & A. Rosa (Eds.), Labeling of Discrete Structures and Applications. New Delhi: Narosa Publishing House.
- Apostol, T. M. (1989). Introduction to analytic number theory. New York, NY: Springer-Verlag.
- Behzad, M. (1969). The connectivity of total graphs. Bulletin of the Australian Mathematical Society, 1, 175–181.
- Bondy, J. A., & Murty, U. S. R. (2008). Graph theory. New York, NY: Springer.
- Brandstädt, A., Le, V. B., & Spinrad, J. P. (1999). Graph classes: A survey. Philadelphia: SIAM.
- Capobianco, M., & Molluzzo, J. (1978). Examples and counterexamples in graph theory. New York, NY: North-Holland.
- Chartrand, G., & Zhang, P. (2005). Introduction to graph theory. New York, NY: McGraw-Hill.
- Deo, N. (1974). Graph theory with application to engineering and computer science. Delhi: PHI.
- Gallian, J. A. (2014). A dynamic survey of graph labeling. The Electronic Journal of Combinatorics, 12, DS-6.
- Germina, K. A., & Abhishek, K. (2012). Set-valued graphs. Journal of Fuzzy Set Valued Analysis, 2012, 1–17. doi:10.5899/2012/jfsva-00127
- Germina, K. A., & Anandavally, T. M. K. (2012). Integer additive set-indexers of a graph: Sum square graphs. Journal of Combinatorics, Information and System Sciences, 37, 345–358.
- Germina, K. A., & Sudev, N. K. (2013). On weakly uniform integer additive set-indexers of graphs. International Mathematical Forum, 8, 1827–1834. doi:10.12988/imf.2013.310188
- Harary, F. (1969). Graph theory. Philippines: Addison-Wesley Publishing Company.
- Hegde, S. M. (1991). On set-valuations of graphs. National Academy Science Letters, 14, 181–182.
- Information system on graph classes and their inclusions (ISCI). (xxxx). Retrieved from http://www.graphclasses.org/smallgraphs
- Joshi, K. D. (2003). Applied discrete structures. New Delhi: New Age International.
- Nathanson, M. B. (1996a). Additive number theory: Inverse problems and geometry of sumsets. New York, NY: Springer.
- Nathanson, M. B. (1996b). Additive number theory: The classical bases. New York, NY: Springer-Verlag.
- Nathanson, M. B. (2000). Elementary methods in number theory. New York, NY: Springer-Verlag.
- Rosa, A. (1967). On certain valuation of the vertices of a graph. In Theory of Graphs. Paris: Gordon and Breach.
- Sudev, N. K., & Germina, K. A. (2014). On Integer additive set-indexers of graphs. The International Journal of Mathematical Sciences and Applications, 8, 11–22.
- Sudev, N. K., & Germina, K. A. (2015a). Some new results on strong integer additive set-indexers. Discrete Mathematics, Algorithms and Applications, 7, 1–11. doi:10.1142/S1793830914500657
- Sudev, N. K., & Germina, K. A. (2015b). On integer additive set-sequential graphs. International Journal of Mathematical Combinatorics, 3, 125–133.
- Sudev, N. K., & Germina, K. A. (2016). A study on integer additive set-graceful labelings of graphs. Journal of Advanced Research in Pure Mathematics.
- Trudeau, R. J. (1993). Introduction to graph theory. New York: Dover Pub.
- Weisstein, E. W. (2011). CRC concise encyclopedia of mathematics. Boca Raton, FL: CRC Press.
- West, D. B. (2001). Introduction to graph theory. Delhi: Pearson Education.