Title :
Efficient embedding K-ary complete trees into hypercubes
Author :
Shen, Xiaojun ; Hu, Qing ; Liang, Weifa
Author_Institution :
Comput. Sci. Telecommun. Program, Missouri Univ., Kansas City, MO, USA
Abstract :
Dilated embedding and precise embedding of K-ary complete trees into hypercubes are studied. For dilated embedding, a nearly optimal algorithm is proposed which embeds a K-ary complete tree of height h, T K(h), into an (h-1)[logK]+[log(K+2)] dimensional hypercube with dilation max(2, φ(K)*), φ(K+2). For precise embedding, we show a (K-1)h+1 dimensional hypercube is large enough to contain TK (h) as its subgraph for K⩾3
Keywords :
hypercube networks; trees (mathematics); K-ary complete trees; dilated embedding; hypercubes; optimal algorithm; precise embedding; Binary trees; Cities and towns; Computer science; Hypercubes; Parallel processing; Topology; Tree graphs;
Conference_Titel :
Parallel Processing Symposium, 1994. Proceedings., Eighth International
Conference_Location :
Cancun
Print_ISBN :
0-8186-5602-6
DOI :
10.1109/IPPS.1994.288226
