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MV-algebra - Wikipedia, the free encyclopedia

MV-algebra

From Wikipedia, the free encyclopedia

This article may be too technical for most readers to understand, and needs attention from an expert on its subject. Please expand it to make it accessible to non-experts, without removing the technical details.

In mathematics, an MV-algebra an algebraic structure first devised by Jan Łukasiewicz to study multi-valued logic. Chang's completeness theorem (1958, 1959) states that any MV-algebra equation holding over the interval [0,1] will hold in every MV-algebra. Hence MV-algebras characterize infinite-valued Łukasiewicz logics, a fact that extends naturally to fuzzy logic. The way the [0,1] MV-algebra characterizes all possible MV-algebras parallels the well-known fact that the two-element Boolean algebra (with carrier {0,1}) characterizes all possible Boolean algebras. Moreover, the way MV-algebras characterize infinite-valued logics is analogous to the way that Boolean algebras characterize standard bivalent (two valued) logic.

Contents

[edit] Definitions

Let A be some underlying set. An MV-algebra is a \left \langle A, \oplus, \lnot, 0 \right \rangle algebra, such that \left \langle A, \oplus, 0 \right \rangle is a commutative monoid satisfying the additional identities:

  • \lnot \lnot x = x,
  • x \oplus \lnot 0 = \lnot 0, and
  • \ \lnot ( \lnot x \oplus y)\oplus y = \lnot ( \lnot y \oplus x) \oplus x.

An MV-algebra may also be defined as a residuated lattice A= \left \langle L, \wedge, \vee, \otimes, \rightarrow, 0, 1 \right \rangle satisfying the additional identity x \vee y = (x \rightarrow y) \rightarrow y \.

On the equivalence between these two formulations, see Hájek (1998).

[edit] Applications

A simple numerical example is A = [0,1], with operations x \oplus y = min(x+y,1) and \lnot x=1-x.

Given some MV-algebra A, an A-valuation is a function from the set of propositional logic formulas into A. Formulas mapped to 1 (or \lnot0) for all A-valuations are A-tautologies. Thus for infinite-valued logics (i.e. fuzzy logic, Łukasiewicz logic), we let [0,1] be the underlying set of A to obtain [0,1]-valuations and [0,1]-tautologies (often simply called "valuations" and "tautologies").

[edit] References

  • Chang, and Keisler, J., 1973. Model Theory. North Holland.
  • Cignoli, R. L. O., D'Ottaviano, I, M. L., Mundici, D., 2000. Algebraic Foundations of Many-valued Reasoning. Kluwer.
  • Di Nola A. , Lettieri A. , Equational characterization of all varieties of MV-algebras, Journal of Algebra 221 (1993) 123-131.
  • Petr Hájek, 1998. Metamathematics of Fuzzy Logic. Kluwer.

[edit] External links

Retrieved from "http://en.wikipedia.org../../../m/v/-/MV-algebra_5595.html"
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