Abstract
The concept of super sextet is clarified and the generalized sextet polynomial in two elements is proposed. Two theorems related to Ohkami-Hosoya conjecture [1] are proved and one novel conjecture is proposed.
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Ohkami N, Hosoya H (1983) Theor Chim Acta 64:153–170
Ohkami N, Motoyama A, Yamaguchi T, Hosoya H, Gutman I (1981) Tetrahedron 37:1113
Clar E (1972) The aromatic sextet. Wiley, London
Balaban AT, Harary F (1968) Tetrahedron 24:2505–2516
Polansky OE, Rouvray DH (1976) MATCH 2:63–90
Harary F (1969) Graph theory. Addison-Wesley, Reading, MA
Bondy JA, Murty USR (1976) Graph theory with applications. The Macmillan Press Ltd
Ham NS (1958) J Chem Phys 29:1229
Wenchen He, Wenjie He (1985) Theor Chim Acta 68:301–313
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Wenjie, H., Wenchen, H. One-to-one correspondence between Kekulé and sextet patterns. Theoret. Chim. Acta 70, 43–51 (1986). https://doi.org/10.1007/BF00531151
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DOI: https://doi.org/10.1007/BF00531151