增量可扩展折叠超立方图

Proceedings 1998 International Conference on Parallel and Distributed Systems (Cat. No.98TB100250) Pub Date : 1998-12-14 DOI:10.1109/ICPADS.1998.741133

Hung-Yi Chang, Rong-Jaye Chen

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引用次数: 5

摘要

本文提出了增量可扩展折叠超立方体(IEFH)图作为一类具有任意数目节点的互连网络。结果表明，该系统具有最优容错性和几乎正则性(即节点最大度与最小度之差不大于1)。该拓扑的直径是不完全超立方体(IH)、超立方体或IEH图的一半。我们还为IEFH图设计了一个简单的路由算法。进一步将循环和完全二叉树最优地嵌入到图中。

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Incrementally extensible folded hypercube graphs

In this paper we propose the incrementally extensible folded hypercube (IEFH) graph as a new class of interconnection networks for an arbitrary number of nodes. We show that this system is optimal fault tolerant and almost regular (i.e., the difference between the maximum and the minimum degree of nodes is at most one.). The diameter of this topology is half that of the incomplete hypercube (IH), the supercube, or the IEH graph. We also devise a simple routing algorithm for the IEFH graph. Further we embed cycles and complete binary trees into this graph optimally.

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Proceedings 1998 International Conference on Parallel and Distributed Systems (Cat. No.98TB100250)

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