Title of article
Extremal double hexagonal chains with respect to k-matchings and k-independent sets Original Research Article
Author/Authors
Haizhen Ren، نويسنده , , Fuji Zhang، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2007
Pages
13
From page
2269
To page
2281
Abstract
“Double hexagonal chains” can be considered as benzenoids constructed by successive fusions of successive naphthalenes along a zig-zag sequence of triples of edges as appear on opposite sides of each naphthalene unit. In this paper, we discuss the numbers of k-matchings and k-independent sets of double hexagonal chains, as well as Hosoya indices and Merrifield–Simmons indices, and obtain some extremal results: among all the double hexagonal chains with the same number of naphthalene units, (a) the double linear hexagonal chain has minimal k-matching number and maximal k-independent set number and (b) the double zig-zag hexagonal chain has maximal k-matching number and minimal k-independent set number, which are extensions to hexagonal chains [L. Zhang and F. Zhang, Extremal hexagonal chains concerning k-matchings and k-independent sets, J. Math. Chem. 27 (2000) 319–329].
Keywords
k-Matching , k-Independent set , Quasi-ordering , Double hexagonal chain
Journal title
Discrete Applied Mathematics
Serial Year
2007
Journal title
Discrete Applied Mathematics
Record number
886590
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