In this paper, Kekule structures of benzenoid chains are considered. It has been shown that the coefficients of a B_n (x) Morgan-Voyce polynomial equal to the number of k-matchings (m(G,k)) of a path graph which has N=2n+1 points. Furtermore, two relations are obtained between regularly zig-zag nonbranched catacondensed benzenid chains and Morgan-Voyce polynomials and between regularly zig-zag nonbranched catacondensed benzenid chains and their corresponding caterpillar trees.
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Gultekin, I., & Sahin, B. (2017). Some Relations Between Kekule Structure and Morgan-Voyce Polynomials. Iranian Journal of Mathematical Chemistry, 8(2), 221-229. doi: 10.22052/ijmc.2017.49481.1177
MLA
I. Gultekin; B. Sahin. "Some Relations Between Kekule Structure and Morgan-Voyce Polynomials", Iranian Journal of Mathematical Chemistry, 8, 2, 2017, 221-229. doi: 10.22052/ijmc.2017.49481.1177
HARVARD
Gultekin, I., Sahin, B. (2017). 'Some Relations Between Kekule Structure and Morgan-Voyce Polynomials', Iranian Journal of Mathematical Chemistry, 8(2), pp. 221-229. doi: 10.22052/ijmc.2017.49481.1177
VANCOUVER
Gultekin, I., Sahin, B. Some Relations Between Kekule Structure and Morgan-Voyce Polynomials. Iranian Journal of Mathematical Chemistry, 2017; 8(2): 221-229. doi: 10.22052/ijmc.2017.49481.1177
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