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11

DM
1998

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On embedding complete graphs into hypercubes

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On embedding complete graphs into hypercubes

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An embedding of Kn into a hypercube is a mapping of the n vertices of Kn to distinct vertices of the hypercube, and the associated cost is the sum over all pairs of (mapped) vertices of the Hamming distance between the vertices. Let f(n) denote the minimum cost over all embeddings of Kn into a hypercube (of any dimension). In this note we prove that f(n) = (n 1)2, unless n = 4 or n = 8, in which case f(n) = (n 1)2

Michael Klugerman, Alexander Russell, Ravi Sundara

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Associated Cost | DM 1998 | Embedding | Hypercube |

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Added	22 Dec 2010
Updated	22 Dec 2010
Type	Journal
Year	1998
Where	DM
Authors	Michael Klugerman, Alexander Russell, Ravi Sundaram

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