论文信息 - Embedding of Hypercubes into Grids

Embedding of Hypercubes into Grids

We consider one-to-one embeddings of the n-dimensional hypercube into grids with 2n vertices and present lower and upper bounds and asymptotic estimates for minimal dilation, edge-congestion, and their mean values. We also introduce and study two new cost-measures for these embeddings, namely the sum over i=1, ..., n of dilations and the sum of edge-congestions caused by the hypercube edges of the ith dimension. It is shown that, in the simulation via the embedding approach, such measures are much more suitable for evaluating the slowdown of uniaxial hypercube algorithms then the traditional cost measures.

L. H. Harper | Markus Röttger | Ulf-Peter Schroeder | Sergei L. Bezrukov | Joe D. Chavez

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