New methods in the analysis of logic minimization data and algorithms

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New methods in the analysis of logic minimization data and algorithms

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Annual ACM IEEE Design Automation Conference archive
Proceedings of the 26th ACM/IEEE Design Automation Conference table of contents

Las Vegas, Nevada, United States

Pages: 226 - 231

Year of Publication: 1989

ISBN:0-89791-310-8

Author

A. J. Coppola

Mentor Graphics Corporation, Eleaverton, OR

Sponsors

SIGDA: ACM Special Interest Group on Design Automation
IEEE-CS\TCDA : TC Design Automation

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 0, Downloads (12 Months): 11, Citation Count: 0

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ABSTRACT

This paper introduces techniques from combinatorial and algebraic topology to help in explaining and measuring the performance of modern logic minimizers. The concepts of simple cubical homotopy and the Euler—Poincare characteristic of a logic cover are defined and analyzed. In particular, simple cubical homotopy is related to the minimization algorithms Espresso—EXACT and Roth's Extraction Algorithm. Experimental results on the Euler—Poincare characteristic, along with a new measure, the Euler Ratio are related to the function complexity concepts of “Cyclic constraints” in Espresso_EXACT, the “CyclicKernel” in Roth's Extraction Algorithm, and “cubical homotopy” introduced in this paper.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

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	2	Robert King Brayton , Alberto L. Sangiovanni-Vincentelli , Curtis T. McMullen , Gary D. Hachtel, Logic Minimization Algorithms for VLSI Synthesis, Kluwer Academic Publishers, Norwell, MA, 1984
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	10	R. Rudell, "Multiple-valued logic minimization for PLA synthesis", Master's report, University of California, Berkeley,
	11	J.H.C. Whitehead, "Simplicial spaces, nucleii and m-groups, Proc. London Math Soc., 45, pp243-327, 1939.