1. INTRODUCTION

In group theory, the commutator is a binary operation on the lattice of normal subgroups of a group which has an important role in the study of solvable, Abelian and nilpotent groups. Given normal subgroups A and B of a group H, their commutator [A,B] is defined to be the smallest normal subgroup of H containing all elements of the form a−1b−1ab for a∈A and b∈B. In other words, [A,B] is the largest normal subgroup K of H such that in the quotient group H/K every element of A/K commutes with every element of B/K. Thus we have a binary operation in the lattice of normal subgroups. This binary operation, together with the lattice operations, carries much of the information about how a group is put together. The operation is also interesting in its own right. It is a commutative, monotone operation, completely distributive with respect to joins in the lattice.

There is also an operation naturally defined on the lattice of ideals of a ring, which has these properties, namely the product of ideals. For ideals I and J of a ring [I,J] be the ideal of R generated by all the products ij and ji , with i∈I and j∈J. The congruity between these two contexts extends to the following fact: [I,J] is the smallest ideal K of R for which every element of the ring I/K commutes multiplicatively with all elements of the ring J/K.

The structural properties of groups and rings were extended to the variety of algebras with permuting congruences by J.D.H. Smith in [1]. His work has laid the foundation for generalizing the commutator theory from groups and rings to an abstract operation on the lattice of congruences of an algebra in permutable varieties. This operation has the same useful properties that the commutator for groups (which is a special case of it) possesses. The resulting theory has also many general applications.

The concept of fuzzy sets was first introduced by L. A. Zadeh [2] in 1965. This idea brings a new approach to model problems relating uncertain and imprecise conditions. In 1971, A.Rosenfeld [3] applied this theory and has formulated the concept of a fuzzy subgroup of a group. Since then, many researchers have been studying fuzzy subalgebras of several algebraic structures such as rings (see [4–6]), modules (see [7–9]), vector spaces (see [10,11]), lattices (see [12–17]), pseudo-complemented semi-lattice (see [18]), posets (see [19,20]), MS-algebras (see [21–24]), universal algebras (see [25–28]), etc.

Fuzzy congruences have been studied in different algebraic structures; in semigroups (see [29,30]), in groups (see [31–33]), in rings (see [34,35]), in modules and vector spaces (see [36,37]), in lattice structures (see [15, 17, 38]), etc. More generally, L. Filep and G.I. Maurer [39], B. S̆es̆elja and A. Tepavc̆evic̆[40], A. Di Nola and G. Gerla [41] have studied fuzzy congruences in some general context in universal algebras. U.M.Swamy and D.V. Raju [42] showed that the set FCon(A) of all L-fuzzy congruences of an algebra A forms an algebraic closure fuzzy set system, where L is a complete lattice satisfying the infinite meet distributive law. In particular, if L is the unit interval [0,1], then FCon(A) is an algebraic lattice and this result coincides with that of Murali [43].

In all the abovementioned articles, a binary operation c on the lattice of fuzzy congruences on an algebra A having the following properties:

1. c(Θ,Φ)≤Θ∩Φ

2. c(Θ,Φ)=c(Φ,Θ)

3. π(c(Θ,Φ))=c(π(Θ),π(Φ))

4. c(∨i∈IΘi,Φ)=∨i∈Ic(Θi,Φ)

for each Θ,Φ,Θi∈FCon(A) and any surjective homomorphism π:A→B, was not obtained in any form. Taking this into account, in this paper, we consider a general universal algebra A of a fixed type F and define a binary operation, which we call it the commutator, on the lattice of fuzzy congruence relations on A having the above properties. In the particular case of modular varieties, we characterize this commutator using the Day’s terms. In this vein, we formulate and prove the fuzzy version of the shifting lemma. Moreover, we give another important characterization of the commutator in the sense of Hagemann and Hermann [44].

The paper is structured as follows: Section 2 presents some notations and basic results we use in what follows. Section 3 is mainly devoted to the development of the commutator theory for fuzzy congruences in general universal algebras with abstract finitary operations. The concept of centralizers is studied in the viewpoint of fuzzy logic and used to define the commutator.

In Section 4, we state and prove the fuzzy version of the well-known result in algebraic geometry called the shifting lemma and we give a detailed characterization for the commutator of fuzzy congruences in modular varieties. In Section 5, we give another description for the commutator of fuzzy congruences in modular varieties in the sense of Hagemann and Hermann [44].

2. PRELIMINARIES

For the standard concepts in universal algebras, we refer to [45,46]. Throughout this paper V is a class of algebras of a fixed type F and A∈V, i.e., A is an algebra of type F. Z(Z+, resp. Z0) denotes the set of all integers (positive integers, resp. non-negative integers). For n∈Z0, we denote by Fn, the set of all n− ary fundamental operations of A. We use the notation a to denote the tuples a1,…,an of elements from A. For n∈Z+, the n− ary terms of type F are formal expressions obtained in finitely many steps by the following process:

1. The variables x1,…,xn are n— ary terms of type F.

2. If m∈Z0, t1,…,tm are n— ary terms of type F and f∈Fm, then f(t1,…,tm) is also a term of type F.

Tn denotes the set of n−ary terms of type F. An equivalence relation θ on A is called a congruence on A if it is compatible with all fundamental operations f on A. The set of all congruence relations on A denoted by Con(A) is a complete lattice together with the usual inclusion order. For θ,ϕ∈Con(A) their relational product θ ∘ ϕ is a relation on A defined by

θ ∘ ϕ= {(x,y)∈A×A:∃ z∈A such that (x,z)∈ϕ and (z,y)∈θ}

A is called congruence permutable (or shortly permutable) if θ ∘ ϕ=ϕ ∘ θ for all θ,ϕ∈Con(A), and V is permutable if all algebras in V are so. A.I. Mal’cev has proved that a variety V is permutable if and only if there is a term p of the variety so that V models the equations [47]:

The following definition is summarized mainly from [48,49].

It was proposed by Gougen [50] that a complete residuated lattice (to which the unit interval [0,1] is a special case of it) is the best candidate to take truth values of fuzzy statements. Residuated lattices have been introduced by Ward and Dilworth [51]. From the view point of fuzzy logic, residuated lattices have been thoroughly investigated by Ho¨ hle (see e.g. [52–54]). More recently, Belohlavek [55] used residuated lattices to study algebras with fuzzy equality. However, in the study of fuzzy substructures (like fuzzy subalgebras, fuzzy ideals, fuzzy congruences, etc.) complete residuated lattices in general are not suitable to obtain a Rosenfeld type characterization for such structures using their level sets. For this reason, we choose special complete residuated lattices called complete Brouwerian lattices (complete lattices satisfying the infinite meet distributive property) to be the structure of truth degrees for fuzzy statements. In the sequel, L=(L,∧,∨,0, 1) is a complete Brouwerian lattice; i.e., L is a complete lattice satisfying the infinite meet distributive law. An L−fuzzy subset of A is any mapping μ:A→L. For each α∈L, the α− level set of μ denoted by μα is a subset of A given by

For L− fuzzy subsets μ and ν of A, we write μ≤ν to mean μ(x)≤ν(x) ∀x∈A in the ordering of L. μ will be called normalized if there is some x∈A with μ(x)=1. By an L— fuzzy relation on A, we mean an L− fuzzy subset of A×A. From now on, we drop the prefix “L—" and simply say fuzzy subsets respectively fuzzy relations on A. Note also that we use lower case Greek letters like θ,ϕ,… to denote crisp relations on A, whereas we use upper case Greek letters like Θ,Φ,… to denote fuzzy relations on A. The following definition is due to [42].

A reflexive, symmetric and transitive fuzzy relation on A is called a fuzzy equivalence relation on A.

3. THE COMMUTATOR

The concept of the commutator of fuzzy subgroups was defined and used to study the notion of commutative fuzzy sets, nilpotenet fuzzy subgroups and solvable fuzzy subgroups in [56,57]. In this section, we define the commutator of fuzzy congruences in a more general setting in universal algebras.

Let Θ,Φ∈FCon(A) and let M(A)2×2 be the set of all matrices of the form [u11u12u21u22] where each uij∈A for i,j∈{1,2}. Define a fuzzy subset ML(Θ,Φ) of M(A)2×2 by

We show that ML(Θ,Φ)α=Bα. Let [u11u12u21u22]∈ML(Θ,Φ)α, then ML(Θ,Φ)([u11u12u21u22])≥α. Let us take the set H as given in Theorem 3.2. Then α≤sup H and [u11u12u21u22]∈M(Θγ,Φγ) for all γ∈H. i.e.,

which implies that [u11u12u21u22]∈Bα and hence ML(Θ,Φ)α⊆Bα. To prove the other inclusion let [u11u12u21u22]∈Bα. Then there exists H⊆L such that α≤supH and [u11u12u21u22]∈M(Θγ,Φγ) for all γ∈H. From Theorem 3.2, we have the following:

So that [u11u12u21u22]∈ML(Θ,Φ)α which gives Bα⊆ML(Θ,Φ)α and hence the equality holds.

Remember that a fuzzy subset μ of A is a fuzzy subalgebra of A if the following conditions are satisfied:

1. If f∈F is nullary, then μ(fA)=1

2. If f∈F is n-ary, n>0 and x1,…,xn∈A, then

   μ(f A(x1,…,xn))≥μ(x1)⋀…⋀μ(xn)

For a fuzzy subset λ of A, always there is the smallest fuzzy subalgebra of A containing λ, namely a fuzzy subalgebra generated by λ and is denoted by FSg(λ). As proved in [42], FSg(λ) can be characterized as follows.