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Biophysics 2015
修改的维纳指数和修改的超维纳指数的若干结果
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Abstract:
| [1] | Gao, Y., Xu, T.W., Liang, L. and Gao, W. (2015) Lower bounds for the general harmonic index of molecular graphs. Journal of Basic and Applied Research International, 7, 144-152. |
| [2] | Gao, W. and Shi, L. (2014) Wiener index of gear fan graph and gear wheel graph. Asian Journal of Chemistry, 26, 3397-3400. |
| [3] | Gao, Y., Gao, W. and Liang, L. (2014) Revised Szeged index and revised edge Szeged index of certain special molecular graphs. International Journal of Applied Physics and Mathematics, 4, 417-425.
http://dx.doi.org/10.17706/ijapm.2014.4.6.417-425 |
| [4] | Gao, Y., Liang, L. and Gao, W. (2015) Shultz polynomial and modified shultz polynomial of certain special molecular graphs. Chemical Technology—An Indian Journal, 11, 17-26. |
| [5] | Gao, Y., Liang, L. and Gao, W. (2015) Szeged polynomial and edge szeged polynomialof certain special molecular graphs. Nano Science and Nano Technology—An Indian Journal, 9, 138-142. |
| [6] | Bondy, J.A. and Murty, U.S.R. (1976) Graph theory with applications. Macmillan Press, London, 1-40. |
| [7] | Xi, W.F. and Gao, W. (2014)λ-Modified extremal hyper-Wiener index of molecular graphs. Journal of Applied Computer Science & Mathematics, 18, 43-46. |
| [8] | Dou, J., Wang, Y. and Gao, W. (2014) Some characteristics on hyper-wiener index of graphs. Journal of Chemical and Pharmaceutical Research, 6, 1659-1663. |
| [9] | Pan, Y. (2013) Wiener number and hyper-wiener number of two types of polyomino systems. Journal of Mathematical Study, 46, 260-269. |
| [10] | Cash, G. (2002) Three methods for calculation of the hyper-wiener index of molecular graphs. Journal of Chemical Information and Computer Science, 42, 571-576. http://dx.doi.org/10.1021/ci0100999 |
