Abstract
Let Q n be the n-dimensional hypercube. If n=2k+1, then the subgraph M n of Q n induced by the nodes having exactly k or k + 1 ones is called the middle cube of dimension n. A famous conjecture is that M n is hamiltonian if n>1.
Clearly, M 3 has two oriented hamiltonian cycles. This paper includes the following new results:
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1.
The number of oriented hamiltonian cycles of M n is divisible by k!(k + 1)!.
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2.
M5 has exactly 48 oriented hamiltonian cycles.
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3.
M7 is hamiltonian.
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4.
Some interesting new combinatorial identities which are relevant to the structure of M n.
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References
Dwight Duffus, Bill Sands and Robert E. Woodrow. Lexicographic Matchings Cannot Form Hamiltonian Cycles. Abstracts of Contributed Talks, Eleventh British Combinatorial Conference, University of London, Goldsmiths' College, 13–17 July 1987.
Niall Graham. center of Q hamiltonian?. E-mail message from niall@nmsu.edu to 00ksbagga@bsuvax1.bitnet sent Friday, 1 December 1989, 13:22:05 MST.
Raymond E. Pippert. Personal communication, May 1989.
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© 1991 Springer-Verlag Berlin Heidelberg
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Bagga, K.S., Owens, F.W. (1991). Low dimensional middle cubes are Hamiltonian. In: Sherwani, N.A., de Doncker, E., Kapenga, J.A. (eds) Computing in the 90's. Great Lakes CS 1989. Lecture Notes in Computer Science, vol 507. Springer, New York, NY. https://doi.org/10.1007/BFb0038466
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DOI: https://doi.org/10.1007/BFb0038466
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Print ISBN: 978-0-387-97628-0
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