Abstract

The notions of fuzzy ideals are introduced in coresiduated lattices. The characterizations of fuzzy ideals, fuzzy prime ideals, and fuzzy strong prime ideals in coresiduated lattices are investigated and the relations between ideals and fuzzy ideals are established. Moreover, the equivalence of fuzzy prime ideals and fuzzy strong prime ideals is proved in prelinear coresiduated lattices. Furthermore, the conditions under which a fuzzy prime ideal is derived from a fuzzy ideal are presented in prelinear coresiduated lattices.

1. Introduction

Residuated lattices provide an algebra frame for the algebraic semantics of formal fuzzy logics such as MV-algebras, BL-algebras, and -algebras (or MTL-algebras) [1–6]. Filters play crucial important role in the proof of the completeness of these logics. Many results about the filter theory of various fuzzy logical algebras have sprang out [7–11]. In fact, ideal and filter are considered as the dual notions of the logical algebra systems in the view of algebra structure. Ideal is also interesting because it is closely related to congruence relation. It plays a vital role in Chang’s Subdirect Representation Theorem of MV-algebras [3]. Actually, the original definition of MV-algebra was characterized by the operator which could be looked as the generation of conorm in lattices. Obviously, there existed an operator such that constituted a pair just like adjoint pair . Therefore, the definition of coadjoint pair was presented in [12], and the definition of coresiduated lattice, as the dual algebra structure of residuated lattice, was introduced in [12]. Coresiduated lattices provide a new frame for logic algebras. It was masterly used to obtain the unified form of intuitionistic fuzzy implications and the Triple I method solutions of intuitionistic fuzzy reasoning problems in [13]. It was also used to obtain the unified form of intuitionistic fuzzy difference operators and the Triple D method solutions of intuitionistic fuzzy reasoning problems in [14]. The properties of ideals in coresiduated lattices were investigated and the embedding theorem of coresiduated lattices was obtained in [15].

In recent years, fuzzy filters in various logic algebras have captured many scholars’ attention. Liu and Li proposed the notion of fuzzy filters to BL-algebras and obtained their relative properties [16, 17]. Jun et al. investigated fuzzy filters in MTL-algebras and lattice implication algebras [18]. Zhu and Xu extended the fuzzy filters in BL-algebras and MTL-algebras to general residuated lattices [19].

In this paper, we intend to introduce the notions of fuzzy ideals in coresiduated lattices and develop the ideal theory of coresiduated lattices. The rest of the paper is structured as follows. In Section 2 we recall the basic notions and existing results that will be used in the paper. In Section 3 we introduce the concept of fuzzy ideals in coresiduated lattices and present the characterizations of fuzzy ideals. In Section 4 we introduce the concepts of fuzzy prime ideals and fuzzy strong prime ideals in coresiduated lattices and obtain some of their characterizations. In Section 5 we advance the fuzzy prime ideal and fuzzy strong prime ideal in prelinear coresiduated lattices.

2. Preliminaries

In this section, we recall some basic concepts and results, which we will need in the subsequent sections.

Definition 1 (see [12]). Let be a poset. is called a coadjoint pair on if the following conditions are satisfied.(1) is isotone.(2) is isotone on first variable and antitone on second variable.(3) iff , .

Definition 2 (see [12]). A structure is called a coresiduated lattice if the following conditions are satisfied.(1) is a bounded lattice, 0 is the smallest element, and 1 is the greatest element of , respectively.(2) is a coadjoint pair on .(3) is a commutative monoid.  is called a -conorm operator on , and is called a fuzzy difference operator on . One denotes CRL as the set of all coresiduated lattices.

Theorem 3 (see [12]). Suppose ; then(1),(2) iff ,(3) iff ,(4),(5),(6),(7),(8),(9),(10),(11),(12),(13).

Definition 4 (see [15]). Suppose ; is an ideal of if one has the following: (1).(2)If , and , then .(3)If , then .is a real ideal of if . A real ideal of is a prime ideal if(4), if , then or . A real ideal of is a strong prime ideal if(5) or .

Theorem 5 (see [15]). Suppose ; is an ideal of if and only if one has the following:(1).(2)If , then .

Theorem 6 (see [15]). Suppose . is a real ideal of and is a (strong) prime ideal of ; if , then is a (strong) prime ideal of .

Proposition 7 (see [15]). Consider ; if is a strong prime ideal of , then is a prime ideal of .

3. Fuzzy Ideals of Coresiduated Lattices

Definition 8. Suppose that is a fuzzy set on , . is a fuzzy ideal of if the following conditions are satisfied:, ,.

Throughout the rest of this paper, unless otherwise stated, always represents a coresiduated lattice and always represents a fuzzy set on .

Proposition 9. Consider and is a fuzzy ideal of ; then f is isotone; that is,.

Proof. , if , then . By and , it follows that

Theorem 10. Consider and is a fuzzy ideal of if and only if.

Proof.  
Sufficiency. Consider , ; it follows by thatSo holds. From Theorem 3(5), ; it follows by thatSo holds.
Necessity. If , then . Because is a fuzzy ideal of , then it follows from that . According to ,Thus . So holds.

From Theorem 10, it is easy to get the following corollary.

Corollary 11. Consider and is a fuzzy set on ; then the following conditions are equivalent:(1) is a fuzzy ideal of ; that is, and hold.(2); that is, holds.(3).(4).

Corollary 12. Consider and is a fuzzy ideal on if and only if, .

Proof.  
Sufficiency. If , it is obviously valid. If , let and , , , from ; then .
If , let , , , ; then ; that is, holds. Thus is a fuzzy ideal on .
Necessity. Consider ; it is obviously valid. Suppose that it is valid if , ; that is,Then, put ; if , thenSoSince is a fuzzy set on , it is obtained that . Therefore, The proof is completed.

Theorem 13. Consider and is a fuzzy ideal of if and only if(1) is isotone; that is, holds;(2).

Proof.  
Sufficiency. Suppose that and hold; it should be proved that holds. If , it follows by and thatSo holds.
Necessity. If is a fuzzy ideal of , it follows from Proposition 9 that is isotone. Since , , then , . Thus .
Moreover, ; it follows from that . Therefore, . The proof is completed.

Let be a fuzzy set on the coresiduated lattice ; it is denoted that

Theorem 14. is a fuzzy ideal of if and only if, , is either an empty set or an ideal of .

Proof.  
Sufficiency. , suppose that , and let . It is obvious that is not an empty set; then is an ideal of , so . Thus ; that is, holds. Put ; then ; that is, . Because is an ideal of , then ; that is, ; thus holds. Therefore, is a fuzzy ideal of .
Necessity. Suppose that is not an empty set; then s.t. . Since is a fuzzy ideal of , then ; that is, . Suppose ; then . Thus ; that is, . It follows from Theorem 5 that is an ideal of .

Corollary 15. Suppose that is a fuzzy ideal of ; then ,is an ideal of .

Proof. Since , it is obtained that ; that is, . It follows from Theorem 14 that is an ideal of .

Corollary 16. Suppose that is a fuzzy ideal of ; then is an ideal of .

Proof. Since is a fuzzy ideal of , then , . So By Corollary 15, is an ideal of . Thus is an ideal of .

Theorem 17. is a fuzzy set on , . If satisfies the conditions(1) is isotone,(2),then is an ideal of .

Proof. Since and is isotone, then ; that is, . If and , then ; that is, . According to (2), . Therefore, is an ideal of .

4. Fuzzy Prime Ideals and Fuzzy Strong Prime Ideals of Coresiduated Lattices

Definition 18. Suppose that is a fuzzy ideal of and not a constant. is a fuzzy prime ideal of if the following conditions are satisfied:,

In this section, it is always assumed that is a fuzzy set on and not a constant.

Theorem 19. is a fuzzy prime ideal of if and only if one has the following: if , then is a prime ideal of .

Proof.  
Sufficiency. Since is not a constant, then s.t. . So is a prime ideal of . If is a prime ideal of , then it is obviously an ideal of . From Theorem 14, is a fuzzy ideal of . So is isotone. , put ; then . Since is a prime ideal, it follows from Definition 4 that or . Let ; then . By , ; that is, is a fuzzy prime ideal of .
Necessity. , if , then . Because is a fuzzy prime ideal of , . Thus or ; that is, or . Therefore, is a prime ideal of .

Definition 20. Suppose that is a fuzzy ideal of and not a constant. is a fuzzy strong prime ideal of if the following conditions are satisfied: or , .

Theorem 21. is a fuzzy strong prime ideal of if and only if one has the following: if , then is a strong prime ideal of .

Proof.  
Sufficiency. Since is not a constant, then s.t. . So is a strong prime ideal of . If is a strong prime ideal of , then it is obviously an ideal of . From Theorem 14, is a fuzzy ideal of . So is isotone. , put ; then . Since is a strong prime ideal, or . Let ; then . Because is isotone, . It is obtained that is a fuzzy strong prime ideal of .
Necessity. Since is a fuzzy strong prime ideal of , it is obvious that is a fuzzy ideal of . According to Theorem 14, , if is an ideal of , then ; that is, . Moreover, is a fuzzy strong prime ideal of . If , then ; that is, . Therefore, is a strong prime ideal of .

Theorem 22. If is a fuzzy strong prime ideal of then is a fuzzy prime ideal of .

Proof. is a fuzzy strong prime ideal of . , let. It follows from Theorem 13, By Theorem 3(5) and (7), Since is isotone, then . Thus . Obviously, . So ; that is, holds. Therefore is a fuzzy prime ideal of .

Suppose that is a real ideal of ; put

According to Theorem 14, is a fuzzy ideal and not a constant. By Theorems 19 and 21, we can get the following two theorems, respectively.

Theorem 23. is a prime ideal of if and only if is a fuzzy prime ideal of .

Theorem 24. is a strong prime ideal of if and only if is a fuzzy strong prime ideal of .

5. Fuzzy Ideals and Fuzzy Prime Ideals of Prelinear Coresiduated Lattices

In a residuated lattice , the condition is called prelinearity axiom (see [1]). Taking account of coresiduated lattice as the dual algebra structure of residuated lattice, the definition of prelinear coresiduated lattice is as follows.

Definition 25 (see [15]). A coresiduated lattice is called a prelinear coresiduated lattice if, .

Theorem 26 (see [15]). Suppose that is a prelinear coresiduated lattice; is an ideal of and ; then there exists a prime ideal of such that and .

Theorem 27. is a prelinear coresiduated lattice. is a fuzzy strong prime ideal of if and only if is a fuzzy prime ideal of .

Proof. Necessity is obvious by Theorem 22.
Sufficiency. , since is a prelinear coresiduated lattice, then . Because is a fuzzy prime ideal of , Thus or .

Corollary 28. Suppose that is a prelinear coresiduated lattice and is a fuzzy ideal of ; then the following conditions are equivalent:(1) is a fuzzy prime ideal of .(2) or .(3) is a fuzzy strong prime ideal of .

Proof. It is only proved that and .
: Since is a fuzzy prime ideal of , then . Because , . Thus or .
: is a prelinear coresiduated lattice; then . So . According to (2), it follows that or .

Remark 29. According to Theorem 27, we do not distinguish between fuzzy strong prime ideal and fuzzy prime ideal in prelinear coresiduated lattices.

Theorem 30. Suppose that is a prelinear coresiduated lattice; is a fuzzy ideal and not a constant; then the following conditions are equivalent:(1) is a chain.(2)Any fuzzy ideal which is not a constant is a fuzzy prime ideal.(3)Any fuzzy ideal such that and not a constant is a fuzzy prime ideal.(4)The fuzzy ideal is a fuzzy prime ideal.

Proof. :  , since is a chain, then or . Thus or . So or . Therefore is a fuzzy prime ideal.
It is obvious that and .
:   is a fuzzy prime ideal; then , or . It is obtained that or ; that is, or . So or ; that is, is a chain.

Theorem 31. Suppose that is a prelinear coresiduated lattice and is a fuzzy prime ideal. If is a fuzzy ideal and not a constant satisfying , , then is a fuzzy prime ideal.

Proof. Since is a fuzzy prime ideal, then, , or . Let . It follows from , that Because is a fuzzy ideal, is isotone. Thus . So . Therefore, is a fuzzy strong prime ideal. The proof is completed.

Theorem 32. Suppose that is a prelinear coresiduated lattice; is a fuzzy prime ideal and ; then is a fuzzy prime ideal of where

Proof. Since is a fuzzy prime ideal, then is a fuzzy ideal. , if , then . So Thus is a fuzzy ideal. By , it is obtained that is not a constant and , . Since is a fuzzy prime ideal, then according to Theorem 31 is a fuzzy prime ideal of .