On Improving the Performance of Tree Machines

Abstract

In this paper we introduce a class of trees, called generalized compressed trees. Generalized compressed trees can be derived from complete binary trees by performing certain ‘contraction’ operations. A generalized compressed tree CT of height h has approximately 25% fewer nodes than a complete binary tree T of height h. We show that these trees have smaller (up to a 74% reduction) 2-dimensional and 3-dimensional VLSI layouts than the complete binary trees. We also show that algorithms initially designed for T can be simulated by CT with at most a constant slow-down. In particular, algorithms having non-pipelined computation structure and originally designed for T can be simulated by CT with no slow-down.