The topological index of a graph G is a numeric quantity related to G which is invariant under automorphisms of G. The vertex PI polynomial is defined as PIv (G) euv nu (e) nv (e). Then Omega polynomial (G,x) for counting qoc strips in G is defined as (G,x) = cm(G,c)xc with m(G,c) being the number of strips of length c. In this paper, a new infinite class of fullerenes is constructed. The vertex PI, omega and Sadhana polynomials of this class of fullerenes are computed for the first time.
GHORBANI, M. (2010). Computing Vertex PI, Omega and Sadhana Polynomials of F12(2n+1) Fullerenes. Iranian Journal of Mathematical Chemistry, 1(Issue 1 (Special Issue on the Role of PI Index in Nanotechnology)), 105-110. doi: 10.22052/ijmc.2010.5140
MLA
M. GHORBANI. "Computing Vertex PI, Omega and Sadhana Polynomials of F12(2n+1) Fullerenes", Iranian Journal of Mathematical Chemistry, 1, Issue 1 (Special Issue on the Role of PI Index in Nanotechnology), 2010, 105-110. doi: 10.22052/ijmc.2010.5140
HARVARD
GHORBANI, M. (2010). 'Computing Vertex PI, Omega and Sadhana Polynomials of F12(2n+1) Fullerenes', Iranian Journal of Mathematical Chemistry, 1(Issue 1 (Special Issue on the Role of PI Index in Nanotechnology)), pp. 105-110. doi: 10.22052/ijmc.2010.5140
VANCOUVER
GHORBANI, M. Computing Vertex PI, Omega and Sadhana Polynomials of F12(2n+1) Fullerenes. Iranian Journal of Mathematical Chemistry, 2010; 1(Issue 1 (Special Issue on the Role of PI Index in Nanotechnology)): 105-110. doi: 10.22052/ijmc.2010.5140
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