Fullerenes are closed−cage carbon molecules formed by 12 pentagonal and n/2 – 10 hexagonal faces, where n is the number of carbon atoms. Patrick Fowler in his lecture in MCC 2009 asked about the Wiener index of fullerenes in general. In this paper we respond partially to this question for an infinite class of fullerenes with exactly 10n carbon atoms. Our method is general and can be applied to fullerene graphs with centrosymmetric adjacency matrix.
GRAOVAC, A., ORI, O., FAGHANI, M., & ASHRAFI, A. (2011). Distance Property of Fullerenes. Iranian Journal of Mathematical Chemistry, 2(Issue 1 (Special Issue on the Occasion of Mircea V. Diudea's Sixtieth Birthday)), 99-107. doi: 10.22052/ijmc.2011.5174
MLA
A. GRAOVAC; O. ORI; M. FAGHANI; A. R. ASHRAFI. "Distance Property of Fullerenes", Iranian Journal of Mathematical Chemistry, 2, Issue 1 (Special Issue on the Occasion of Mircea V. Diudea's Sixtieth Birthday), 2011, 99-107. doi: 10.22052/ijmc.2011.5174
HARVARD
GRAOVAC, A., ORI, O., FAGHANI, M., ASHRAFI, A. (2011). 'Distance Property of Fullerenes', Iranian Journal of Mathematical Chemistry, 2(Issue 1 (Special Issue on the Occasion of Mircea V. Diudea's Sixtieth Birthday)), pp. 99-107. doi: 10.22052/ijmc.2011.5174
VANCOUVER
GRAOVAC, A., ORI, O., FAGHANI, M., ASHRAFI, A. Distance Property of Fullerenes. Iranian Journal of Mathematical Chemistry, 2011; 2(Issue 1 (Special Issue on the Occasion of Mircea V. Diudea's Sixtieth Birthday)): 99-107. doi: 10.22052/ijmc.2011.5174
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