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generalized toposes with many-valued logic subobject classifiers (Topic)

Introduction

Generalized topoi (toposes) with many-valued algebraic logic subobject classifiers are specified by the associated categories of algebraic logics previously defined as $LM_n$, that is, non-commutative lattices with $n$ logical values, where $n$ can also be chosen to be any cardinal, including infinity, etc.

Algebraic category of $LM_n$ logic algebras

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 $LM_n$-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].

Generalized logic spaces defined by $LM_n$ algebraic logics

Axioms defining generalized topoi

  • Consider a subobject logic classifier $\Omega$ defined as an LM-algebraic logic $L_n$ in the category ${\bf L}$ of LM-logic algebras, together with logic-valued functors $F_{\omega}: {\bf L} \to V$, where $V$ is the class of N logic values, with $N$ needing not be finite.
  • A triple $(\Omega,L,F_{\omega})$ defines a generalized topos, $\tau$, if the above axioms defining $\Omega$ are satisfied, and if the functor $F_{\omega}$ is an univalued functor in the sense of Mitchell.

More to come...

Applications of generalized topoi:

Applications of generalized topoi:

  • XY
  • YZ

Generalized logic `spaces' defined by LMn.

  • XY
  • YZ

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
Baianu, I.C.: 2004a. Łukasiewicz-Topos Models of Neural Networks, Cell Genome and Interactome Nonlinear Dynamic Models (2004). Eprint. Cogprints–Sussex Univ.
5
Baianu, I.C.: 2004b Łukasiewicz-Topos Models of Neural Networks, Cell Genome and Interactome Nonlinear Dynamics). CERN Preprint EXT-2004-059. Health Physics and Radiation Effects (June 29, 2004).
6
Baianu, I. C., Glazebrook, J. F. and G. Georgescu: 2004, Categories of Quantum Automata and N-Valued Łukasiewicz Algebras in Relation to Dynamic Bionetworks, (M,R)–Systems and Their Higher Dimensional Algebra, Abstract and Preprint of Report in PDF .
7
Baianu I. C., Brown R., Georgescu G. and J. F. Glazebrook: 2006b, Complex Nonlinear Biodynamics in Categories, Higher Dimensional Algebra and Łukasiewicz–Moisil Topos: Transformations of Neuronal, Genetic and Neoplastic Networks., Axiomathes, 16 Nos. 1–2: 65–122.



"generalized toposes with many-valued logic subobject classifiers" is owned by bci1.

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Other names:  quantum logic candidates
Also defines:  generalized toposes, many-valued logic subobject classifiers
Keywords:  generalized toposes

Cross-references: genetic networks, quantum automata, topos, functors, modules, topological groupoid, semigroup, topological, quantum logics, representations, many-valued logics, non-commutative, categories, algebraic
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This is version 3 of generalized toposes with many-valued logic subobject classifiers, born on 2009-05-01, modified 2010-12-22.
Object id is 705, canonical name is GeneralizedToposesWithManyValuedLogicSubobjectClassifiers.
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Classification:
Physics Classification00. (GENERAL)
 02. (Mathematical methods in physics)
 03. (Quantum mechanics, field theories, and special relativity )
 03.65.Fd (Algebraic methods )
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