The Omega polynomial(x) was recently proposed by Diudea, based on the length of strips in given graph G. The Sadhana polynomial has been defined to evaluate the Sadhana index of a molecular graph. The PI polynomial is another molecular descriptor. In this paper we compute these three polynomials for some infinite classes of nanostructures.
Proceedings of the First Iranian Conference on Chemical Graph Theory, Shahid Rajaee Teacher Training University, Tehran, October 6 - 7, 2010 (Ed. M. Ghorbani)
GHORBANI, M., & SONGHORI, M. (2012). On Counting Polynomials of Some Nanostructures. Iranian Journal of Mathematical Chemistry, 3(Supplement 1), 51-58. doi: 10.22052/ijmc.2012.5275
MLA
M. GHORBANI; M. SONGHORI. "On Counting Polynomials of Some Nanostructures", Iranian Journal of Mathematical Chemistry, 3, Supplement 1, 2012, 51-58. doi: 10.22052/ijmc.2012.5275
HARVARD
GHORBANI, M., SONGHORI, M. (2012). 'On Counting Polynomials of Some Nanostructures', Iranian Journal of Mathematical Chemistry, 3(Supplement 1), pp. 51-58. doi: 10.22052/ijmc.2012.5275
VANCOUVER
GHORBANI, M., SONGHORI, M. On Counting Polynomials of Some Nanostructures. Iranian Journal of Mathematical Chemistry, 2012; 3(Supplement 1): 51-58. doi: 10.22052/ijmc.2012.5275
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