Information about Multi Valued Logic
Multi-valued logics are logical calculi in which there are more than two truth values. Traditionally, logical calculi are two-valued—that is, there are only two possible truth values (i.e. truth and falsehood) for any proposition to take. An obvious extension to classical two-valued logic is an n>2-ary logic. Those most popular in the literature are three-valued (e.g. Łukasiewicz's and Kleene's) and infinite-valued (e.g. fuzzy logic) ones.
Multi-valued logics are intended to preserve the property of designationhood (or being designated). Since there are more than two truth values, rules of inference may be intended to preserve more than just whichever corresponds (in the relevant sense) to truth. For example, in a three-valued logic, sometimes the two greatest truth-values (when they are represented as e.g. positive integers) are designated and the rules of inference preserve these values. Precisely, a valid argument will be such that the value of the premises taken jointly will always be less than or equal to the conclusion.
For example, the preserved property could be justification, the foundational concept of intuitionistic logic. Thus, a proposition is not true or false; instead, it is justified or flawed. A key difference between justification and truth, in this case, is that the law of the excluded middle doesn't hold: a proposition that is not flawed is not necessarily justified; instead, it's only not proven that it's flawed. The key difference is the determinacy of the preserved property: One may prove that P is justified, that P is flawed, or be unable to prove either. A valid argument preserves justification across transformations, so a proposition derived from justified propositions is still justified. However, there are proofs in classical logic that depend upon the law of excluded middle; since that law is not usable under this scheme, there are propositions that cannot be proven that way.
Another example of an infinitely-valued logic is probability logic.
The 20th century brought the idea of multi-valued logic back. The Polish logician and philosopher Jan Łukasiewicz began to create systems of many-valued logic in 1920, using a third value "possible" to deal with Aristotle's paradox of the sea battle. Meanwhile, the American mathematician Emil L. Post (1921) also introduced the formulation of additional truth degrees with n>=2,where n are the truth values. Later Jan Łukasiewicz and Alfred Tarski together formulated a logic on n truth values where n>=2 and in 1932 Hans Reichenbach formulated a logic of many truth values where n→infinity. Kurt Gödel in 1932 showed that intuitionistic logic is not a finitely-many valued logic, and defined a system of Gödel logics intermediate between classical and intuitionistic logic; such logics are known as intermediate logics.
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Relation to classical logic
Logics are usually systems intended to codify rules for preserving some semantic property of propositions across transformations. In classical logic, this property is "truth". In a valid argument, the truth of the derived proposition is guaranteed if the premises are jointly true, because the application of valid steps preserves the property. However, that property doesn't have to be that of "truth"; instead, it can be some other concept.Multi-valued logics are intended to preserve the property of designationhood (or being designated). Since there are more than two truth values, rules of inference may be intended to preserve more than just whichever corresponds (in the relevant sense) to truth. For example, in a three-valued logic, sometimes the two greatest truth-values (when they are represented as e.g. positive integers) are designated and the rules of inference preserve these values. Precisely, a valid argument will be such that the value of the premises taken jointly will always be less than or equal to the conclusion.
For example, the preserved property could be justification, the foundational concept of intuitionistic logic. Thus, a proposition is not true or false; instead, it is justified or flawed. A key difference between justification and truth, in this case, is that the law of the excluded middle doesn't hold: a proposition that is not flawed is not necessarily justified; instead, it's only not proven that it's flawed. The key difference is the determinacy of the preserved property: One may prove that P is justified, that P is flawed, or be unable to prove either. A valid argument preserves justification across transformations, so a proposition derived from justified propositions is still justified. However, there are proofs in classical logic that depend upon the law of excluded middle; since that law is not usable under this scheme, there are propositions that cannot be proven that way.
Relation to fuzzy logic
Multi-valued logic is strictly related with Fuzzy set theory and fuzzy logic. The notion of fuzzy subset was introduced by Lotfi Zadeh as a formalization of vagueness; i.e., the phenomenon that a predicate may apply to an object not absolutely, but to a certain degree, and that there may be borderline cases. Fuzzy logic (in narrow sense) is an attempt to define formal apparatus to give a rigorous fondation for fuzzy set theory and to define an adequate notion of approximate reasoning. As multi-valued logic, fuzzy logic admits truth values different from "true" and "false". Indeed, usually the set of possible truth values is the whole interval [0,1]. Nevertheless, the main difference between fuzzy logic and multi-valued logic is in the aims. In fact, in spite of its philosophical interest (it can be used to deal with the sorites paradox), fuzzy logic is devoted mainly to the applications. Moreover, a basic difference is in the deduction apparatus. In fact, in fuzzy logic an extension of the usual notion of a proof is defined in such a way that a proof is valid at a given degree. This enables us to define how from a fuzzy set of hypotheses we can derive a fuzzy set of consequences. Instead, usually multi-valued logic is interested to define how from a classical set of hypotheses we can derive a classical set of consequences.Another example of an infinitely-valued logic is probability logic.
History
The first known classical logician who didn't fully accept the law of the excluded middle was Aristotle (who, ironically, is also generally considered to be the first classical logician and the "father of logic"[1]), who admitted that his laws did not all apply to future events (De Interpretatione, ch. IX). But he didn't create a system of multi-valued logic to explain this isolated remark. The later logicians until the coming of the 20th century followed Aristotelian logic, which includes or implies the law of the excluded middle.The 20th century brought the idea of multi-valued logic back. The Polish logician and philosopher Jan Łukasiewicz began to create systems of many-valued logic in 1920, using a third value "possible" to deal with Aristotle's paradox of the sea battle. Meanwhile, the American mathematician Emil L. Post (1921) also introduced the formulation of additional truth degrees with n>=2,where n are the truth values. Later Jan Łukasiewicz and Alfred Tarski together formulated a logic on n truth values where n>=2 and in 1932 Hans Reichenbach formulated a logic of many truth values where n→infinity. Kurt Gödel in 1932 showed that intuitionistic logic is not a finitely-many valued logic, and defined a system of Gödel logics intermediate between classical and intuitionistic logic; such logics are known as intermediate logics.
See also
- MV-algebra
- IEEE_1164
Patents
- Takatsu, U.S. Patent 5,644,253 "Multiple-valued logic circuit". July 1, 1997.
References
- Chang C.C. and Keisler H. J. 1966. Continuous Model Theory, Princeton, Princeton University Press.
- Cignoli, R. L. O., D'Ottaviano, I, M. L., Mundici, D., 2000. Algebraic Foundations of Many-valued Reasoning. Kluwer.
- Hájek P., 1998, Metamathematics of fuzzy logic. Kluwer.
- Malinowski, Gregorz, 2001, Many-Valued Logics, in Goble, Lou, ed., The Blackwell Guide to Philosophical Logic. Blackwell.
- Gerla G. 2001, Fuzzy logic: Mathematical Tools for Approximate Reasoning, Kluwer Academic Publishers, Dordrecht.
- Goguen J.A. 1968/69, The logic of inexact concepts, Synthese, 19, 325-373.
- Gottwald S. 2000, S. A Treatise on Many-Valued Logics, Research Studies Press, Baldock.
- Pavelka J. 1979, On fuzzy logic I: Many-valued rules of inference, Zeitschr. f. math. Logik und Grundlagen d. Math., 25, 45-52.
External links
- Stanford Encyclopedia of Philosophy: "Many-Valued Logic" -- by Siegfried Gottwald.
Notes
In logic and mathematics, a propositional calculus (or a sentential calculus) is a formal system in which formulas representing propositions can be formed by combining atomic propositions using logical connectives, and a system of formal proof rules
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In logic and mathematics, a logical value, also called a truth value, is a value indicating the extent to which a proposition is true.
In classical logic, the only possible truth values are true and false.
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In classical logic, the only possible truth values are true and false.
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proposition is the content of an assertion, that is, it is true-or-false and defined by the meaning of a particular piece of language. The proposition is independent of the of communication.
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Stephen Kleene
Born January 5 1909
USA
Died January 25 1994 (aged 85)
Residence USA
Nationality USA
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Born January 5 1909
USA
Died January 25 1994 (aged 85)
Residence USA
Nationality USA
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Fuzzy Logic may refer to:
Fuzzy logic
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- Fuzzy Logic (album), the debut album by the Super Furry Animals
- Fuzzy logic, an application of fuzzy set theory
- For the music album, see Fuzzy Logic (album)
Fuzzy logic
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Intuitionistic logic, or constructivist logic, is the symbolic logic system originally developed by Arend Heyting to provide a formal basis for Brouwer's programme of intuitionism.
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Fuzzy sets are sets whose elements have degrees of membership. Fuzzy sets have been introduced by Lotfi A. Zadeh (1965) as an extension of the classical notion of set. In classical set theory, the membership of elements in a set is assessed in binary terms according to a bivalent
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Fuzzy Logic may refer to:
Fuzzy logic
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- Fuzzy Logic (album), the debut album by the Super Furry Animals
- Fuzzy logic, an application of fuzzy set theory
- For the music album, see Fuzzy Logic (album)
Fuzzy logic
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Lotfali Askar Zadeh
Lotfali A. Zadeh in 2004
Born Februrary 12, 1921
Nationality Iranian
Field Mathematics
Institutions U.C.
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Lotfali A. Zadeh in 2004
Born Februrary 12, 1921
Nationality Iranian
Field Mathematics
Institutions U.C.
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vagueness. One example of a vague concept is the concept of a heap. Two or three grains of sand is not a heap, but a thousand is. How many grains of sand does it take to make a heap? There is no clear line. (See the paradox of the heap.
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Fuzzy Logic may refer to:
Fuzzy logic
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- Fuzzy Logic (album), the debut album by the Super Furry Animals
- Fuzzy logic, an application of fuzzy set theory
- For the music album, see Fuzzy Logic (album)
Fuzzy logic
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The Sorites paradox (σωρός (sōros) being Greek for "heap" and σωρίτης (sōritēs) the adjective) is a paradox that arises from vague predicates.
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The aim of a probabilistic logic (or probability logic) is to combine the capacity of probability theory to handle uncertainty with the capacity of deductive logic to exploit structure.
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Aristotle (Greek: Ἀριστοτέλης Aristotélēs) (384 BC – 322 BC) was a Greek philosopher, a student of Plato and teacher of Alexander the Great.
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Emil Leon Post
Born February 11, 1897
Augustów, then Russian Empire ,
today Poland
Died April 21 1954,
New York City, U.S.
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Born February 11, 1897
Augustów, then Russian Empire ,
today Poland
Died April 21 1954,
New York City, U.S.
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Alfred Tarski (January 14, 1902, Warsaw, Russian-ruled Poland – October 26, 1983, Berkeley, California) was a logician and mathematician who spent four decades as a professor of mathematics at the University of California, Berkeley.
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Hans Reichenbach (September 26, 1891, Hamburg, – April 9, 1953, Los Angeles) was a leading philosopher of science, educator and proponent of logical empiricism. Reichenbach is best known for founding the Berlin Circle, and as the author of
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Kurt Gödel
Kurt Gödel
Born March 28 1906
Brünn (Brno) Austria-Hungary
Died January 14 1978 (aged 73)
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Kurt Gödel
Born March 28 1906
Brünn (Brno) Austria-Hungary
Died January 14 1978 (aged 73)
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Intuitionistic logic, or constructivist logic, is the symbolic logic system originally developed by Arend Heyting to provide a formal basis for Brouwer's programme of intuitionism.
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Classical logic identifies a class of formal logics that have been most intensively studied and most widely used. They are characterised by a number of properties[1]; non-classical logics are those that lack one or more of these properties, which are:
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In mathematical logic, an intermediate logic (also called superintuitionistic) is a propositional logic extending intuitionistic logic. Classical logic is the strongest consistent intermediate logic, whence the name (the logics are intermediate
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The Stanford Encyclopedia of Philosophy (SEP) is a freely-accessible online encyclopedia of philosophy maintained by Stanford University. The SEP was initially developed with U.S. public funding from the NEH and NSF.
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