DocumentCode
3240431
Title
Revisiting the decomposition of Karp, Miller and Winograd
Author
Darte, Alain ; Vivien, Frédéric
Author_Institution
LIP, CNRS URA, Ecole Normale Superieure de Lyon, France
fYear
1995
fDate
24-26 Jul 1995
Firstpage
13
Lastpage
25
Abstract
This paper is devoted to the construction of multi-dimensional schedules for a system of uniform recurrence equations. We show that this problem is dual to the problem of computability of a system of uniform recurrence equations. We propose a new study of the decomposition algorithm first proposed by Karp, Miller and Winograd: we base our implementation on linear programming resolutions whose duals give exactly the desired multi-dimensional schedules. Furthermore, we prove that the schedules built this way are optimal up to a constant factor
Keywords
computability; formal specification; linear programming; computability; decomposition algorithm; linear programming; multi-dimensional schedules; uniform recurrence equations; Councils; Design methodology; Difference equations; Linear programming; Mathematical model; Power system modeling; Processor scheduling; Scheduling algorithm; Systolic arrays; Vectors;
fLanguage
English
Publisher
ieee
Conference_Titel
Application Specific Array Processors, 1995. Proceedings. International Conference on
Conference_Location
Strasbourg
ISSN
1063-6862
Print_ISBN
0-8186-7109-2
Type
conf
DOI
10.1109/ASAP.1995.522901
Filename
522901
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