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algebraic category of LMn -logic algebras

(Topic)

This is a topic entry on the algebraic category of Łukasiewicz–Moisil n-valued logic algebras that provides basic concepts and the background of the modern development in this area of many-valued logics.

Introduction

The category $\mathcal{LM}$ of Łukasiewicz-Moisil, $n$

-valued logic algebras ( $LM_n$

), and

–lattice morphisms, $\lambda_{LM_n}$ , was introduced in 1970 in ref. [1] as an algebraic category tool for $n$

-valued logic studies. The objects of $\mathcal{LM}$ are the non–commutative $LM_n$

lattices and the morphisms of $\mathcal{LM}$ are the $LM_n$

-lattice morphisms as defined here in the section following a brief historical note.

History

Łukasiewicz logic algebras were constructed by Grigore Moisil in 1941 to define `nuances' in logics, or many-valued logics, as well as 3-state control logic (electronic) circuits. Łukasiewicz-Moisil ( $LM_n$

) logic algebras were defined axiomatically in 1970, in ref. [1], as n-valued logic algebra representations and extensions of the Łukasiewcz (3-valued) logics; then, the universal properties of categories of $LM_n$

-logic algebras were also investigated and reported in a series of recent publications ([2] and references cited therein). Recently, several modifications of -logic algebras are under consideration as valid candidates for representations of quantum logics, as well as for modeling non-linear biodynamics in genetic `nets' or networks ([3]), and in single-cell organisms, or in tumor growth. For a recent review on $n$

-valued logic algebras, and major published results, the reader is referred to [2].

Definition of Łukasiewicz–Moisil (LM), n-valued logic algebras

Definition 0.1 (reported by G. Moisil in 1941, cited in refs. [1,2]).

A –valued Łukasiewicz–Moisil algebra, ( $LM_{n}$ –algebra) is a structure of the form $(L,\vee,\wedge,N,(\phi _{i})_{i\in\{1,\ldots,n-1\}},0,1)$ , subject to the following axioms:

(L1) $(L,\vee,\wedge,N,0,1)$ is a de Morgan algebra, that is, a bounded distributive lattice with a decreasing involution satisfying the de Morgan property $N({x\vee y})=Nx\wedge Ny$ ;
(L2) For each $i\in\{1,\ldots,n-1\}$ , $\phi _{i}:L{\longrightarrow}L$ is a lattice endomorphism;
(L3) For each $i\in\{1,\ldots,n-1\},x\in L$ , $\phi _{i}(x)\vee N{\phi _{i}(x)}=1$ and $\phi _{i}(x)\wedge N{\phi _{i}(x)}=0$ ;
(L4) For each $i,j\in\{1,\ldots,n-1\}$ , $\phi _{i}\circ\phi _{j}=\phi _{k}$ iff ;
(L5) For each $i,j\in\{1,\ldots,n-1\}$ , $i\leqslant j$ implies $\phi _{i}\leqslant \phi _{j}$ ;
(L6) For each $i\in\{1,\ldots,n-1\}$ and $x\in L$ , $\phi _{i}(N x)=N\phi _{n-i}(x)$ .
(L7) Moisil's `determination principle':

$\displaystyle \left[\forall i\in\{1,\ldots,n-1\},\;\phi _{i}(x)=\phi _{i}(y)\right] \; implies \; [x = y] \;.$

Example 0.1 Let $L_n=\{0,1/(n-1),\ldots,(n-2)/(n-1),1\}$ . This set can be naturally endowed with an LM $_n$

–algebra structure as follows:

the bounded lattice operations are those induced by the usual order on rational numbers;
for each $j\in\{0,\ldots,n-1\}$ , ;
for each $i\in\{1,\ldots,n-1\}$ and $j\in\{0,\ldots,n-1\}$ , $\phi _{i}(j/(n-1))=0$ if and otherwise.

Note that, for $n=2$

, $L_n=\{0,1\}$ , and there is only one Chrysippian endomorphism of $L_n$

is $\phi _1$ , which is necessarily restricted by the determination principle to a bijection, thus making $L_n$

a Boolean algebra (if we were also to disregard the redundant bijection $\phi _1$ ). Hence, the `overloaded' notation $L_2$

, which is used for both the classical Boolean algebra and the two–element LM $_2$

–algebra, remains consistent.

Example 0.2 Consider a Boolean algebra $(B,\v ,\wedge ,{}^-,0,1)$ . Let $T(B)=\{(x_1,\ldots,x_n)\in B^{n-1}\mid x_1\leqslant \ldots\leqslant x_{n-1}\}$ . On the set $T(B)$

, we define an LM $_n$

-algebra structure as follows:

the lattice operations, as well as 0 and , are defined component–wise from $L_{2}$ ;
for each $(x_1,\ldots,x_{n-1})\in T(B)$ and $i\in\{1,\ldots,n-1\}$ one has:
$N(x_1,\ldots x_{n-1})=(\overline {x_{n-1}},\ldots,\overline {x_1})$ and $\phi _{i}(x_1,\ldots,x_n)=(x_i,\ldots,x_i) .$

Bibliography

1: Georgescu, G. and C. Vraciu. 1970, On the characterization of centered Łukasiewicz algebras., J. Algebra, 16: 486-495.
2: Georgescu, G. 2006, N-valued Logics and Łukasiewicz-Moisil Algebras, Axiomathes, 16 (1-2): 123-136.
3: Baianu, I.C.: 1977, A Logical Model of Genetic Activities in Łukasiewicz Algebras: The Non-linear Theory. Bulletin of Mathematical Biology, 39: 249-258.
4: Georgescu, G. and D. Popescu. 1968, On Algebraic Categories, Revue Roumaine de Mathématiques Pures et Appliquées, 13: 337-342.

Footnotes

... endomorphism;: The $\phi_{i}$ 's are called the Chrysippian endomorphisms of .

"algebraic category of LMn -logic algebras" is owned by bci1.

Other names:

\Lukasiewicz-Moisil n-valued logic algebras, N-valued logic algebras, many-valued logic

Also defines:

LMn -logic algebra, $LM_n$

-logic algebra, many-valued logic

Keywords:

algebraic category of LMn -logic algebras, genetic nets, Jan \L{}ukasiewicz, topic on algebra classification, axioms of metacategories and supercategories, non-Abelian theory, non-Abelian structures, non-commutative dynamic modeling diagrams, generalized toposes with many-valued logic subobject classifiers, quantum logics toposes, topic entry on foundations of mathematics, axiomatic theories and categorical foundations of mathematics-II, axiomatics and categorical foundations of mathematical physics, categorical algebra, topic on algebra classification, topic entry on the algebraic foundations of mathematics, Jordan-Banach and Jordan-Lie algebras, ETAS interpretation, examples of abelian categories, genetic nets, category theory

Cross-references: operations, quantum logics, representations, section, morphisms, objects, category, algebraic category
There are 14 references to this object.

This is version 4 of algebraic category of LMn -logic algebras, born on 2009-01-31, modified 2009-05-16.
Object id is 460, canonical name is AlgebraicCategoryOfLMnLogicAlgebras.
Accessed 1916 times total.

Classification:

Physics Classification:	00. (GENERAL)
	02. (Mathematical methods in physics)
	03. (Quantum mechanics, field theories, and special relativity )
	03.65.Fd (Algebraic methods )

Pending Errata and Addenda

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