David Bourget (Western Ontario)
David Chalmers (ANU, NYU)
Rafael De Clercq
Jack Alan Reynolds
Learn more about PhilPapers
Studia Logica 20 (1):37 - 61 (1967)
In Part I of this paper, an abstract analogue of the minimization problem for Boolean functions and of the notion of prime implicant is defined, so that this general problem can be solved in the same steps as in the classical case: 1) determination of the prime implicants; 2) determination of all the solutions made up of prime implicants. In Part II it is shown that the classical minimization problem, as well as certain set-theoretical and graphtheoretical problems are particular cases of the general problem defined in Part I
|Keywords||No keywords specified (fix it)|
|Categories||categorize this paper)|
Setup an account with your affiliations in order to access resources via your University's proxy server
Configure custom proxy (use this if your affiliation does not provide a proxy)
|Through your library|
References found in this work BETA
No references found.
Citations of this work BETA
No citations found.
Similar books and articles
Ilkka Niiniluoto (1982). What Shall We Do with Verisimilitude? Philosophy of Science 49 (2):181-197.
Ivor Grattan-Guinness (2008). Levels of Criticism: Handling Popperian Problems in a Popperian Way. [REVIEW] Axiomathes 18 (1):37-48.
Giorgio Vallortigara & Luca Tommasi (2001). Minimization of Modal Contours: An Instance of an Evolutionary Internalized Geometric Regularity? Behavioral and Brain Sciences 24 (4):706-707.
Jonathan B. King (1993). Learning to Solve the Right Problems: The Case of Nuclear Power in America. [REVIEW] Journal of Business Ethics 12 (2):105 - 116.
Roland Phillipe Cuneo (1975). Selected Problems of Minimization of Variable-Valued Logic Formulas. Dept. Of Computer Science, University of Illinois at Urbana-Champaign.
Leora Morgenstern (2001). Mid-Sized Axiomatizations of Commonsense Problems: A Case Study in Egg Cracking. Studia Logica 67 (3):333-384.
Added to index2009-01-28
Total downloads3 ( #292,272 of 1,100,757 )
Recent downloads (6 months)2 ( #176,465 of 1,100,757 )
How can I increase my downloads?