Title :
Hybrid spectral transform diagrams
Author :
Clarke, E.M. ; Fujita, M. ; Heinle, W.
Author_Institution :
Sch. of Comput. Sci., Carnegie Mellon Univ., Pittsburgh, PA, USA
Abstract :
We give a uniform algebraic framework for computing hybrid spectral transforms in an efficient manner. Based on properties of the Kronecker product, we derive a set of recursive equations, which leads naturally to an algorithm for computing such transforms efficiently. As a result, many applications of transforms like the Walsh transform and the Reed-Muller transform, which were previously impossible because of memory constraints, have now become feasible. The same set of recursive equations also gives a new way of explaining hybrid transform diagrams, an efficient data-structure for integer valued Boolean functions
Keywords :
Boolean functions; spectral analysis; transforms; tree data structures; Kronecker product; Reed-Muller transform; Walsh transform; data-structure; hybrid spectral transform diagrams; integer valued Boolean functions; recursive equations; uniform algebraic framework; Application software; Boolean functions; Circuit testing; Computer science; Equations; Indexing; Laboratories; Memory management; Transforms; Vectors;
Conference_Titel :
Information, Communications and Signal Processing, 1997. ICICS., Proceedings of 1997 International Conference on
Print_ISBN :
0-7803-3676-3
DOI :
10.1109/ICICS.1997.647097
