Abstract
Minimization of Boolean switching functions is a basic problem in the design of logic circuits. The designer first comes up with a switching function expressed in terms of several binary input variables that satisfies the desired functionality, and then attempts to minimize the function as a sum of products or product of sums. It turns out that a sum of products form of a switching function that has no redundancy is a union of prime implicants of the function.
In this paper we would like to explicate some of the relationships of the boolean minimization problem to a formalization of abductive inference called parsimonious covering . Abductive inference often occurs in diagnostic problems such as finding the causes of circuit faults [Reiter, 87] or determining the diseases causing the symptoms reported by a patient [Peng and Reggia, 90]. Parsimonious covering involves covering all observed facts by means of a parsimonious set of explanations that can account for the observations. The relationship of parsimonious covering to boolean minimization has been noted by the developers of the theory; we intend to pursue a detailed mapping here.
Original language | American English |
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Pages | 1164-1169 |
Number of pages | 6 |
DOIs | |
State | Published - May 1991 |
Event | 1991 National Aerospace and Electronics Conference - Dayton, United States Duration: May 20 1991 → May 24 1991 |
Conference
Conference | 1991 National Aerospace and Electronics Conference |
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Abbreviated title | NAECON 1991 |
Country/Territory | United States |
City | Dayton |
Period | 5/20/91 → 5/24/91 |
ASJC Scopus Subject Areas
- General Engineering
Keywords
- Computer Science
- Diseases
- Cost Function
- Design Engineering
- Logic Circuits
- Minimization
- Redundancy
- Switching Circuits
- Venus
Disciplines
- Bioinformatics
- Communication
- Communication Technology and New Media
- Databases and Information Systems
- OS and Networks
- Science and Technology Studies