DOCSLIB.ORG

Representing Integral Quantales and Residuated Lattices by Tolerances

Total Page:16

File Type:pdf, Size:1020Kb

Download full-text PDF Read full-text
Representing Integral Quantales and Residuated Lattices by Tolerances Representing integral quantales and residuated lattices by tolerances by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with Kalle Kaarli, Tartu Univ.) SSAOS 54, Trojanovice, Czech Republic, Sept. 3-9, 2016. by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) Quantales are certain partially ordered algebraic structures that generalize locales (point free topologies) as well as various multplicative lattices of ideals from ring theory. Residuated lattices were introduced by Dilworth and Ward and they are used in several branches of mathematics, including areas of ideal lattices of rings, lattice-ordered groups, multivalued logic and formal languages. In our lecture, we try to show that integral quantales and complete integral residuated lattices are strongly related with the complete tolerances of their underlying lattice. 1. Background and preliminaries by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) In our lecture, we try to show that integral quantales and complete integral residuated lattices are strongly related with the complete tolerances of their underlying lattice. 1. Background and preliminaries Quantales are certain partially ordered algebraic structures that generalize locales (point free topologies) as well as various multplicative lattices of ideals from ring theory. Residuated lattices were introduced by Dilworth and Ward and they are used in several branches of mathematics, including areas of ideal lattices of rings, lattice-ordered groups, multivalued logic and formal languages. by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) 1. Background and preliminaries Quantales are certain partially ordered algebraic structures that generalize locales (point free topologies) as well as various multplicative lattices of ideals from ring theory. Residuated lattices were introduced by Dilworth and Ward and they are used in several branches of mathematics, including areas of ideal lattices of rings, lattice-ordered groups, multivalued logic and formal languages. In our lecture, we try to show that integral quantales and complete integral residuated lattices are strongly related with the complete tolerances of their underlying lattice. by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) Definition 1. A quantale is an algebraic structure Q = (L; _; ), such that (L; ≤) is a complete lattice (induced by the join operation _) and (L; ) is a semigroup satisfying W W W W a bi = (a bi ) and bi a = (bi a). i2I i2I i2I i2I for all a 2 L and bi 2 L, i 2 I . Q is called commutative, if is commutative, and Q is unital, whenever (L; ) is a monoid. A unital quantale in which the neutral element of coincides to the greatest element 1 of the lattice L is called integral. Hence in any integral quantale 1 x = x 1 = x (1.1) A subset K ⊆ L is called a subquantale of Q if it is closed under arbitrary joins and . General notions by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) A quantale is an algebraic structure Q = (L; _; ), such that (L; ≤) is a complete lattice (induced by the join operation _) and (L; ) is a semigroup satisfying W W W W a bi = (a bi ) and bi a = (bi a). i2I i2I i2I i2I for all a 2 L and bi 2 L, i 2 I . Q is called commutative, if is commutative, and Q is unital, whenever (L; ) is a monoid. A unital quantale in which the neutral element of coincides to the greatest element 1 of the lattice L is called integral. Hence in any integral quantale 1 x = x 1 = x (1.1) A subset K ⊆ L is called a subquantale of Q if it is closed under arbitrary joins and . General notions Definition 1. by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) Q is called commutative, if is commutative, and Q is unital, whenever (L; ) is a monoid. A unital quantale in which the neutral element of coincides to the greatest element 1 of the lattice L is called integral. Hence in any integral quantale 1 x = x 1 = x (1.1) A subset K ⊆ L is called a subquantale of Q if it is closed under arbitrary joins and . General notions Definition 1. A quantale is an algebraic structure Q = (L; _; ), such that (L; ≤) is a complete lattice (induced by the join operation _) and (L; ) is a semigroup satisfying W W W W a bi = (a bi ) and bi a = (bi a). i2I i2I i2I i2I for all a 2 L and bi 2 L, i 2 I . by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) A subset K ⊆ L is called a subquantale of Q if it is closed under arbitrary joins and . General notions Definition 1. A quantale is an algebraic structure Q = (L; _; ), such that (L; ≤) is a complete lattice (induced by the join operation _) and (L; ) is a semigroup satisfying W W W W a bi = (a bi ) and bi a = (bi a). i2I i2I i2I i2I for all a 2 L and bi 2 L, i 2 I . Q is called commutative, if is commutative, and Q is unital, whenever (L; ) is a monoid. A unital quantale in which the neutral element of coincides to the greatest element 1 of the lattice L is called integral. Hence in any integral quantale 1 x = x 1 = x (1.1) by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) General notions Definition 1. A quantale is an algebraic structure Q = (L; _; ), such that (L; ≤) is a complete lattice (induced by the join operation _) and (L; ) is a semigroup satisfying W W W W a bi = (a bi ) and bi a = (bi a). i2I i2I i2I i2I for all a 2 L and bi 2 L, i 2 I . Q is called commutative, if is commutative, and Q is unital, whenever (L; ) is a monoid. A unital quantale in which the neutral element of coincides to the greatest element 1 of the lattice L is called integral. Hence in any integral quantale 1 x = x 1 = x (1.1) A subset K ⊆ L is called a subquantale of Q if it is closed under arbitrary joins and . by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) (b) The two-sided ideals of a ring (R; +; ·) with unit form an integral quantale (I(R); _; •), where (I(R); _; \) is the complete lattice of the ideals of R and • is their usual multiplication, i.e. for any I ; J 2 I(R) we P have I • J := f fini · j j i 2 I , j 2 Jg. Definition 2. A residuated lattice is an algebra L = (L; _; ^; ; n; =; 1) of type (2,2,2,2,2,0) such that (i)( L; _; ^) is a lattice, (ii)( L; ) is a semigroup satisfying 1 x = x 1 = x, for all x 2 L. (iii) L satisfies the adjointness properties, that is, for all x; y; z 2 L x y ≤ z , y ≤ xnz , x ≤ z=y: L is called commutative, if is commutative. In this case xny and y=x being equal, they are denoted as x ! y. Examples 1. (a) Frames are commutative quantales in which and the meet operation ^ coincide. by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) Definition 2. A residuated lattice is an algebra L = (L; _; ^; ; n; =; 1) of type (2,2,2,2,2,0) such that (i)( L; _; ^) is a lattice, (ii)( L; ) is a semigroup satisfying 1 x = x 1 = x, for all x 2 L. (iii) L satisfies the adjointness properties, that is, for all x; y; z 2 L x y ≤ z , y ≤ xnz , x ≤ z=y: L is called commutative, if is commutative. In this case xny and y=x being equal, they are denoted as x ! y. Examples 1. (a) Frames are commutative quantales in which and the meet operation ^ coincide. (b) The two-sided ideals of a ring (R; +; ·) with unit form an integral quantale (I(R); _; •), where (I(R); _; \) is the complete lattice of the ideals of R and • is their usual multiplication, i.e. for any I ; J 2 I(R) we P have I • J := f fini · j j i 2 I , j 2 Jg. by S´andor Radeleczki, Math. Institute, Univ. of Miskolc (joint research with KalleAggregation Kaarli, Tartu Univ.) L is called commutative, if is commutative. In this case xny and y=x being equal, they are denoted as x ! y. Examples 1. (a) Frames are commutative quantales in which and the meet operation ^ coincide. (b) The two-sided ideals of a ring (R; +; ·) with unit form an integral quantale (I(R); _; •), where (I(R); _; \) is the complete lattice of the ideals of R and • is their usual multiplication, i.e. for any I ; J 2 I(R) we P have I • J := f fini · j j i 2 I , j 2 Jg. Definition 2. A residuated lattice is an algebra L = (L; _; ^; ; n; =; 1) of type (2,2,2,2,2,0) such that (i)( L; _; ^) is a lattice, (ii)( L; ) is a semigroup satisfying 1 x = x 1 = x, for all x 2 L. (iii) L satisfies the adjointness properties, that is, for all x; y; z 2 L x y ≤ z , y ≤ xnz , x ≤ z=y: by S´andor Radeleczki, Math.
Load more

Recommended publications
  • Finitely-Valued Propositional Dynamic Logic
    Finitely-valued Propositional Dynamic Logic Igor Sedl´ar∗ The Czech Academy of Sciences, Institute of Computer Science Pod Vod´arenskou vˇeˇz´ı271/2 Prague, The Czech Republic Abstract We study a many-valued generalization of Propositional Dynamic Logic where formulas in states and accessibility relations between states of a Kripke model are evaluated in a finite FL-algebra. One natural interpretation of this framework is related to reasoning about costs of performing structured actions. We prove that PDL over any finite FL-algebra is decidable. We also establish a general completeness result for a class of PDLs based on commutative integral FL-algebras with canonical constants. Keywords: FL-algebras, Many-valued modal logic, Propositional Dynamic Logic, Residuated lattices, Substructural logics, Weighted structures. 1 Introduction Propositional dynamic logic, PDL, is a well-known modal logic formalizing reasoning about structured actions, e.g. computer programs or actions performed by physical agents, and their correctness properties [10, 17]. PDL is subject to two limiting design features. First, being based on classical propositional logic, it formalizes actions that modify values of Boolean variables. A more general setting, one where variables take values from an ar- bitrary set (integers, characters, trees etc.), is offered by variants of first-order Dynamic Logic, DL [16, 17]; these variants, however, are mostly undecidable. Second, PDL can express the fact that one action is guaranteed to attain a certain goal while another action is not, but it is not able to express that one action is a more efficient way of attaining the goal than another action. In other words, accessibility between states mediated by actions arXiv:2012.12133v1 [cs.LO] 22 Dec 2020 is modelled as a crisp rather than a graded relation; the former approach is a convenient idealization, but the latter one is more realistic and often also practically required.
    [Show full text]
  • The Structure of Residuated Lattices
    The Structure of Residuated Lattices Kevin Blount and Constantine Tsinakis May 23, 2002 Abstract A residuated lattice is an ordered algebraic structure L = hL, ∧, ∨, · , e, \ , / i such that hL, ∧, ∨i is a lattice, hL, ·, ei is a monoid, and \ and / are binary operations for which the equivalences a · b ≤ c ⇐⇒ a ≤ c/b ⇐⇒ b ≤ a\c hold for all a, b, c ∈ L. It is helpful to think of the last two operations as left and right division and thus the equivalences can be seen as “di- viding” on the right by b and “dividing” on the left by a. The class of all residuated lattices is denoted by RL. The study of such objects originated in the context of the theory of ring ideals in the 1930’s. The collection of all two-sided ideals of a ring forms a lattice upon which one can impose a natural monoid structure making this object into a residuated lattice. Such ideas were investi- gated by Morgan Ward and R. P. Dilworth in a series of important papers [15], [16],[45], [46], [47] and [48] and also by Krull in [33]. Since that time, there has been substantial research regarding some specific classes of residuated structures, see for example [1], [9], [26] and [38], but we believe that this is the first time that a general structural the- ory has been established for the class RL as a whole. In particular, we develop the notion of a normal subalgebra and show that RL is an “ideal variety” in the sense that it is an equational class in which con- gruences correspond to “normal” subalgebras in the same way that ring congruences correspond to ring ideals.
    [Show full text]
  • Commutative Residuated Lattices
    Commutative Residuated Lattices James B. Hart, Lori Rafter, and Constantine Tsinakis September 21, 2000 Abstract A commutative residuated lattice, is an ordered algebraic struc- ture L = (L, ·, ∧, ∨, →, e), where (L, ·, e) is a commutative monoid, (L, ∧, ∨) is a lattice, and the operation → satisfies the equiva- lences a · b ≤ c ⇐⇒ a ≤ b → c ⇐⇒ b ≤ c → a for a, b, c ∈ L. The class of all commutative residuated lattices, denoted by CRL, is a finitely based variety of algebras. Histor- ically speaking, our study draws primary inspiration from the work of M. Ward and R. P. Dilworth appearing in a series of important papers [9] [10], [19], [20], [21] and [22]. In the en- suing decades special examples of commutative, residuated lat- tices have received considerable attention, but we believe that this is the first time that a comprehensive theory on the struc- ture of residuated lattices has been presented from the viewpoint of universal algebra. In particular, we show that CRL is an ”ideal variety” in the sense that its congruences correspond to order- convex subalgebras. As a consequence of the general theory, we present an equational basis for the subvariety CRLc generated by all commutative, residuated chains. We conclude the paper by proving that the congruence lattice of each member of CRLc is an 2000 Mathematics Subject Classification Primary 06B05; Secondary 06A15, 06B10, 06B20, 06D20, 06F05, 06F07, 06F20 1 algebraic, distributive lattice whose meet-prime elements form a root-system (dual tree). This result, together with the main results in [12] and [18], will be used in a future publication to an- alyze the structure of finite members of CRLc.
    [Show full text]
  • Arxiv:1609.05261V1 [Math.LO]
    BL-RINGS OLIVIER A, HEUBO-KWEGNA, CELESTIN LELE, JEAN B. NGANOU Abstract. The main goal of this article is to introduce BL-rings, i.e., com- mutative rings whose lattices of ideals can be equipped with a structure of BL-algebra. We obtain a description of such rings, and study the connec- tions between the new class and well known classes such as multiplications rings, Baer rings, Dedekind rings. Key words: Multiplication ring, Baer ring, subdirectly irreducible ring, BL- ring. 1. Introduction Given any ring (commutative or not, with or without unity) R generated by idempotents, the semiring of ideals of R under the usual operations form a residuated lattice A(R). In recent articles, several authors have investigated classes of rings for which the residuated lattice A(R) an algebra of a well- known subvariety of residuated lattices. For instance, rings R for which A(R) is an MV-algebra, also calledLukasiewicz rings are investigated in [2], rings R for which A(R) is a G¨odel algebra, also called G¨odel rings are investigated in [3], and very recently rings R for which A(R) is an pseudo MV-algebra, also called GeneralizedLukasiewicz rings are investigated in [11]. In the same spirit, the goal of the present article is we introduce and in- vestigate the class of commutative rings R for which A(R) is a BL-algebra, arXiv:1609.05261v1 [math.LO] 17 Sep 2016 also referred to as BL-rings. Among other things, we show that this class is properly contained in the class of multiplication rings as treated in [9], and contains properly each of the classes of Dedekind domains,Lukas iewicz rings, discrete valuation rings, Noetherian multiplication rings.
    [Show full text]
  • Some Properties of Residuated Lattices
    Some properties of residuated lattices Radim Bˇelohl´avek, Ostrava Abstract We investigate some (universal algebraic) prop- erties of residuated lattices — algebras which play the role of structures of truth values of various systems of fuzzy logic. Keywords: residuated lattice, fuzzy logic, variety, congru- ence 1991 Mathematics Subject Classification: 03B52, 06F05, 08A30, 08A40, 08B05 The interest in fuzzy logic has been rapidly growing recently (see [14], also [6, 19]). Several new algebras playing the role of the structures of truth values have been introduced and axiomatized (i.e. a system of logical axioms complete w.r.t. semantics defined over the class of corresponding algebras has been found). The aim of this paper is to investigate some (universal algebraic) properties of algebraic structures of fuzzy logic. We investigate, among others, some congruence properties which have shown to be important in universal algebra. Whenever possible, we apply some general condition known from universal algebra (we use Mal’cev-type con- ditions). Doing so, we obtain instances of the universal algebraic conditions for the algebraic structures of fuzzy logic in question. This approach, in a sense, makes visible the “very reason” of why a structure obeys a property. The most general structure considered here is that of a residuated lattice. Residuated lattices were introduced in [9] (it should be, however, noted that the motivation was by far not logical) and reinvigorated in the context of fuzzy logic in [12]. The following definition stems from [16]: Definition 1 A residuated lattice is an algebra L = hL, ∧, ∨, ⊗, →, 0, 1i such that (i) hL, ∧, ∨, 0, 1i is a lattice (the corresponding order will be denoted by ≤) with the least element 0 and the greatest element 1, (ii) hL, ⊗, 1i is a commutative monoid (i.e.
    [Show full text]
  • Density Revisited
    Soft Computing manuscript No. (will be inserted by the editor) Density Revisited George Metcalfe · Constantine Tsinakis Dedicated to the memory of Franco Montagna. totallyReceived: date / Accepted: date Abstract In this (part survey) paper, we revisit algebraic and proof-theoretic methods developed by Franco Montagna and his co-authors for proving that the chains (totally ordered members) of certain varieties of semilinear residuated lattices embed into dense chains of these varieties, a key step in establishing standard completeness results for fuzzy logics. Such “densifiable” varieties are precisely the varieties that are generated as quasivarieties by their dense chains. By showing that all dense chains satisfy a certain e-cyclicity equation, we give a short proof that the variety of all semilinear residuated lattices is not densifiable (first proved by Wang and Zhao). We then adapt the Jenei{Montagna standard completeness proof for monoidal t-norm logic to show that any variety of integral semilinear residuated lattices axiomatized by additional lattice-ordered monoid equations is densifiable. We also generalize known results to show that certain varieties of cancellative semilinear residuated lattices are densifiable. Finally, we revisit the Metcalfe{Montagna proof-theoretic approach, which establishes densifiability of a variety via the elimination of a density rule for a suitable hypersequent calculus, focussing on the case of commutative semilinear residuated lattices. Keywords Many-Valued Logics · Fuzzy Logics · Standard Completeness · Residuated Lattices · Semilinearity · Density Rule 1 Introduction Proving the completeness of an axiom system with respect to an intended semantics is a familiar problem in the study of logical systems. For classical propositional logic, | downloaded: 29.9.2021 the Lindenbaum-Tarski construction can be used to show that derivability of a formula α is equivalent to the validity of the equation α ≈ 1 in the class BA of all Boolean algebras.
    [Show full text]
  • Generalized MV-Algebras
    Generalized MV-algebras Nikolaos Galatos School of Information Science Japan Advanced Institute of Science and Technology 1-1 Asahidai, Tatsunokuchi, Ishikawa, 923-1292, Japan Constantine Tsinakis Department of Mathematics Vanderbilt University 1326 Stevenson Center, Nashville, TN 37240, USA Abstract We generalize the notion of an MV-algebra in the context of residuated lattices to include non-commutative and unbounded structures. We investigate a number of their properties and prove that they can be obtained from lattice-ordered groups via a truncation construction that generalizes the Chang-Mundici ¡ functor. This correspondence extends to a categorical equivalence that generalizes the ones es- tablished by D. Mundici and A. Dvure·censkij.The decidability of the equational theory of the variety of generalized MV-algebras follows from our analysis. Key words: residuated lattice, MV-algebra, lattice-ordered group, nucleus, categorical equivalence 1991 MSC: 06F05, 06D35, 06F15, 03G10 1 Introduction A residuated lattice is an algebra L = hL; ^; _; ¢; n; =; ei such that hL; ^; _i is a lattice; hL; ¢; ei is a monoid; and for all x; y; z 2 L, x ¢ y · z , x · z=y , y · xnz: Email addresses: [email protected] (Nikolaos Galatos), [email protected] (Constantine Tsinakis). URLs: http://www.jaist.ac.jp/~galatos (Nikolaos Galatos), http://sitemason.vanderbilt.edu/site/g4VM2c (Constantine Tsinakis). Preprint submitted to Elsevier Science 7 July 2004 Residuated lattices form a ¯nitely based equational class of algebras (see, for example, [4]), denoted by RL. It is important to remark that the elimination of the requirement that a residu- ated lattice have a bottom element has led to the development of a surprisingly rich theory that includes the study of various important varieties of cancella- tive residuated lattices, such as the variety of lattice-ordered groups.
    [Show full text]
  • Residuated Frames with Applications to Decidability
    TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY Volume 365, Number 3, March 2013, Pages 1219–1249 S 0002-9947(2012)05573-5 Article electronically published on October 31, 2012 RESIDUATED FRAMES WITH APPLICATIONS TO DECIDABILITY NIKOLAOS GALATOS AND PETER JIPSEN Abstract. Residuated frames provide relational semantics for substructural logics and are a natural generalization of Kripke frames in intuitionistic and modal logic, and of phase spaces in linear logic. We explore the connection between Gentzen systems and residuated frames and illustrate how frames provide a uniform treatment for semantic proofs of cut-elimination, the fi- nite model property and the finite embeddability property, which imply the decidability of the equational/universal theories of the associated residuated lattice-ordered groupoids. In particular these techniques allow us to prove that the variety of involutive FL-algebras and several related varieties have the finite model property. Substructural logics and their algebraic formulation as varieties of residuated lattices and FL-algebras provide a general framework for a wide range of logical and algebraic systems, such as Classical propositional logic ↔ Boolean algebras Intuitionistic logic ↔ Heyting algebras Lukasiewicz logic ↔ MV-algebras Abelian logic ↔ abelian lattice-ordered groups Basic fuzzy logic ↔ BL-algebras Monoidal t-norm logic ↔ MTL-algebras Noncommutative mult. add. linear logic ↔ InFL-algebras Full Lambek calculus ↔ FL-algebras and lattice-ordered groups, symmetric relation algebras and many other systems. In this paper we introduce residuated frames and show that they provide rela- tional semantics for substructural logics and representations for residuated struc- tures. Our approach is driven by the applications of the theory. As is the case with Kripke frames for modal logics, residuated frames provide a valuable tool for solving both algebraic and logical problems.
    [Show full text]
  • Representation of Integral Quantales by Tolerances
    Representation of integral quantales by tolerances Kalle Kaarli and Sandor´ Radeleczki Dedicated to the memory of E. Tam´asSchmidt Abstract. The central result of the paper claims that every integral quantale Q has a natural embedding into the quantale of complete tolerances on the underlying lattice of Q. As an application, we show that the underlying lattice of any integral quantale is distributive in 1 and dually pseudocomplemented. Besides, we exhibit relationships between several earlier results. In particular, we give an alternative approach to Valentini's ordered sets and show how the ordered sets are related to tolerances. 1. Introduction Quantales are certain partially ordered algebraic structures that generalize locales (point free topologies) as well as various multiplicative lattices of ideals from ring theory and functional analysis (C∗-algebras, von Neumann algebras), see e.g., [17]. Definition 1.1. A quantale is an algebraic structure Q = (Q; _; ·) such that (Q; ≤) is a complete lattice (induced by the join operation _) and (Q; ·) is a semigroup satisfying _ _ a · fbi j i 2 Ig = fabi j i 2 Ig; (1.1) _ _ fbi j i 2 Ig · a = fbia j i 2 Ig (1.2) for all a 2 Q and bi 2 Q, i 2 I. Remark 1.2. As usual, we often write xy instead of x · y. In what follows the underlying lattice of a quantale Q is denoted by L. Thus, the universes of Q and L coincide: Q = L. The smallest and the greatest element of L will be denoted by 0 and 1, respectively.
    [Show full text]
  • L-Fuzzy Ideals of Residuated Lattices
    Discussiones Mathematicae General Algebra and Applications 39 (2019) 181–201 doi:10.7151/dmgaa.1313 L-FUZZY IDEALS OF RESIDUATED LATTICES Pierre Carole Kengne 1, Blaise Bleriot´ Koguep 1∗ Daniel Akume 2 and Celestin Lele 1 1Department of Mathematics and Computer Science University of Dschang, Cameroon 2Computer Science Department, HTTTC Kumba University of Buea, Cameroon e-mail: [email protected] [email protected] d−[email protected] [email protected] Abstract This paper mainly focuses on building the L-fuzzy ideals theory of resid- uated lattices. Firstly, we introduce the notion of L-fuzzy ideals of a resid- uated lattice and obtain their properties and equivalent characterizations. Also, we introduce the notion of prime fuzzy ideal, fuzzy prime ideal and fuzzy prime ideal of the second kind of a residuated lattice and establish existing relationships between these types of fuzzy ideals. Finally, we in- vestigate the notions of fuzzy maximal ideal and maximal fuzzy ideal of a residuated lattice and present some characterizations. Keywords: fuzzy ideal, fuzzy prime ideal, prime fuzzy ideal, fuzzy maximal ideal and maximal fuzzy ideal. 2010 Mathematics Subject Classification: no numbers. Introduction Dealing with certain and uncertain information is an important task of the arti- ficial intelligence, in order to make computer simulate human being. To handle such information, in 1965, Zadeh [15] introduced the notion of fuzzy subset of a non empty set X as a function µ : X → I, where I = [0, 1] is the unit in- terval of real numbers. Since then, many authors have been using the above ∗Corresponding author. 182 P.C.
    [Show full text]
  • Categories of Residuated Lattices
    University of Denver Digital Commons @ DU Electronic Theses and Dissertations Graduate Studies 1-1-2018 Categories of Residuated Lattices Daniel Wesley Fussner University of Denver Follow this and additional works at: https://digitalcommons.du.edu/etd Part of the Algebra Commons, and the Logic and Foundations Commons Recommended Citation Fussner, Daniel Wesley, "Categories of Residuated Lattices" (2018). Electronic Theses and Dissertations. 1527. https://digitalcommons.du.edu/etd/1527 This Dissertation is brought to you for free and open access by the Graduate Studies at Digital Commons @ DU. It has been accepted for inclusion in Electronic Theses and Dissertations by an authorized administrator of Digital Commons @ DU. For more information, please contact [email protected],[email protected]. Categories of Residuated Lattices A Dissertation Presented to the Faculty of Natural Sciences and Mathematics University of Denver In Partial Fulfillment of the Requirements for the Degree Doctor of Philosophy by Daniel Wesley Fussner November 2018 Advisor: Nikolaos Galatos c Copyright by Daniel Wesley Fussner 2018 All Rights Reserved Author: Daniel Wesley Fussner Title: Categories of Residuated Lattices Advisor: Nikolaos Galatos Degree Date: November 2018 Abstract We present dual variants of two algebraic constructions of certain classes of residuated lattices: The Galatos-Raftery construction of Sugihara monoids and their bounded expansions, and the Aguzzoli-Flaminio-Ugolini quadruples construction of srDL-algebras. Our dual presentation of these constructions is facilitated by both new algebraic results, and new duality-theoretic tools. On the algebraic front, we provide a complete description of implications among nontrivial distribution properties in the context of lattice-ordered structures equipped with a residuated binary operation.
    [Show full text]
  • Arxiv:1804.06933V1 [Math.LO]
    ON PRINCIPAL CONGRUENCES IN DISTRIBUTIVE LATTICES WITH A COMMUTATIVE MONOIDAL OPERATION AND AN IMPLICATION RAMON JANSANA AND HERNAN´ JAVIER SAN MART´IN Abstract. In this paper we introduce and study a variety of algebras that properly includes integral distributive commutative residuated lattices and weak Heyting algebras. Our main goal is to give a characterization of the principal congruences in this variety. We apply this description in order to study compatible functions. 1. Introduction It is very convenient to have good descriptions of the principal congruences of the algebras of a variety. One type of description is having first-order definable principal congruences. A much simpler and useful type of description is having equationally definable principal congruences. This concept was introduced in [20, 21]. Recall that a variety V has equationally definable principal congruences (EDPC) if there r exists a finite family of quaternary terms {ui, vi}i=1 such that for every algebra A in V and every principal congruence θ(a,b) of A1, it holds that (c, d) ∈ θ(a,b) if and only if ui(a,b,c,d) = vi(a,b,c,d) for each i = 1,...,r. The property EDPC is also of logical interest because an algebraizable logic whose equivalent algebraic semantics is a variety V has some form of deduction-detachment theorem if and only if the variety V has EDPC, a consequence of a more general result proved by Blok and Pigozzi in [5, Thm. 5.5](see also [19, Thm. 3.85]). There are varieties that do not have EDPC but where it is still possible to have a good characterization of the principal congruences with the following local version r of EDPC: there exists a finite family of quaternary terms {u(i,n,k), v(i,n,k)}i=1 (with n, k ≥ 0) such that for every principal congruence θ(a,b) of any algebra A in the variety it holds that (c, d) ∈ θ(a,b) if and only if there exist n, k ≥ 0 such that u(i,n,k)(a,b,c,d) = v(i,n,k)(a,b,c,d) for every i = 1,...r.
    [Show full text]