Omega polynomial Ω(, ) is defined on opposite edge strips ops in a graph G = G(V,E). The first and second derivatives, in X = 1, of Omega polynomial provide the Cluj-Ilmenau CI index. Close formulas for calculating these topological descriptors in an infinite lattice consisting of all R[8] faces, related to the famous Dyck graph, is given.
DIUDEA, M. (2010). Omega Polynomial in All R[8] Lattices. Iranian Journal of Mathematical Chemistry, 1(Issue 1 (Special Issue on the Role of PI Index in Nanotechnology)), 69-77. doi: 10.22052/ijmc.2010.5135
MLA
M. V. DIUDEA. "Omega Polynomial in All R[8] Lattices", Iranian Journal of Mathematical Chemistry, 1, Issue 1 (Special Issue on the Role of PI Index in Nanotechnology), 2010, 69-77. doi: 10.22052/ijmc.2010.5135
HARVARD
DIUDEA, M. (2010). 'Omega Polynomial in All R[8] Lattices', Iranian Journal of Mathematical Chemistry, 1(Issue 1 (Special Issue on the Role of PI Index in Nanotechnology)), pp. 69-77. doi: 10.22052/ijmc.2010.5135
VANCOUVER
DIUDEA, M. Omega Polynomial in All R[8] Lattices. Iranian Journal of Mathematical Chemistry, 2010; 1(Issue 1 (Special Issue on the Role of PI Index in Nanotechnology)): 69-77. doi: 10.22052/ijmc.2010.5135
)