New Bounds for Oblivious Mesh Routing
DOI:
https://doi.org/10.7155/jgaa.00038Abstract
We give two, new upper bounds for oblivious permutation routing on the mesh networks: Let N be the total number of processors in each mesh. One is an $O( N^{0.75})$ algorithm on the two-dimensional, $\sqrt{N} \times \sqrt{N}$ mesh with constant queue-size. This is the first algorithm which improves substantially the trivial $O(N)$ bound for oblivious routing in the mesh networks with constant queue-size. The other is a $1.16 \sqrt{N} + o(\sqrt{N})$ algorithm on the three-dimensional, $N^{1/3} \times N^{1/3} \times N^{1/3}$ mesh with unlimited queue-size. This algorithm allows at most three bends in the path of each packet. If the number of bends is restricted to minimal, i.e., at most two, then the bound jumps to $\Omega( N^{2/3})$ as was shown in ESA'97.Downloads
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Published
2024-03-16
How to Cite
Iwama, K., Kambayashi, Y., & Miyano, E. (2024). New Bounds for Oblivious Mesh Routing. Journal of Graph Algorithms and Applications, 5(5), 17–38. https://doi.org/10.7155/jgaa.00038
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Copyright (c) 2001 Kazuo Iwama, Yahiko Kambayashi, Eiji Miyano
This work is licensed under a Creative Commons Attribution 4.0 International License.
