Abstract

We first introduce a new mixed equilibrium problem with a relaxed monotone mapping in Banach spaces and prove the existence of solutions of the equilibrium problem. Then we introduce a new iterative algorithm for finding a common element of the set of solutions of the equilibrium problem and the set of fixed points of a quasi--nonexpansive mapping and prove some strong convergence theorems of the iteration. Our results extend and improve the corresponding ones given by Wang et al., Takahashi and Zembayashi, and some others.

1. Introduction

Let be a Banach space with the dual space and let be a nonempty closed convex subset of . Let be a bifunction from to , where denotes the set of numbers. The equilibrium problem is to find such that

The set of solutions of the above equilibrium problem is denoted by .

In order to solve the equilibrium problem, the bifunction is usually to be assumed that following conditions are satisfied:(A1) for all ;(A2) is monotone; that is, for all ;(A3)for all , (A4)for all , is convex and lower semicontinuous.

Recently, Takahashi and Zembayashi [1] extended the equilibrium problems and fixed point problems from Hilbert spaces to Banach spaces. More precisely, they gave the following iterative scheme: where is a relatively nonexpansive mapping from into itself such that , is the duality mapping on , and satisfies and for some . They proved that the sequence generated by (3) converges strongly to , where is the generalized projection of onto .

Very recently, Qin et al. [2] introduced the following hybrid algorithm to solve the equilibrium problems and fixed point problems for quasi--nonexpansive mappings in a uniformly convex and uniformly smooth Banach space with a nonempty closed convex subset of : where and are two quasi--nonexpansive mappings from into itself such that , , , and are three sequences in satisfying some certain conditions. They proved that the sequence generated by (4) converges strongly to , where is the generalized projection of onto .

In [3], Fang and Huang introduced a concept called a relaxed --monotone mapping.

A mapping is said to be relaxed  --monotone  if there exist a mapping and a function with for all and , where is a constant, such that

Especially, if for all and , where and are two constants, then is said to be -monotone (see, e.g., [4–6]). They proved that, under some suitable assumptions, the following variational inequality is solvable: find such that where is a function from to . They also proved that the variational inequality (6) is equivalent to the following: find such that

In this paper, let us denote the set of solutions of the variational inequality (6) or (7) by .

It is worthy to notice that it is possible that is a singleton set, includes the finite elements or infinite elements. To show this, we see the following example.

Example 1. Let and . Define the mappings by for all , by for all , and by for all . Then the mapping is a relaxed --monotone mapping. In fact, for all , , we have
Hence, is a relaxed --monotone mapping. Now by defining the different function we find the solution set of (6). First we compute, for , , (i)Let the function for all . It is easy to see that the solution set . That is, only when , (6) holds for all .(ii)Let the function and for all . By (9), it is not hard to see that the solution set .(iii)Let the function for all where and for all . Then by (9) we see that . In this case, includes the unfinite elements.

Recently, Wang et al. [7] proposed the following equilibrium problem in a Hilbert space with a nonempty closed convex bounded subset : find such that where is a relaxed --monotone mapping. They introduced a new algorithm for solving the equilibrium problem in Hilbert spaces.

In [3], Fang and Huang did not give the algorithm to solve the variational inequality (6) or (7). In this paper, motivated and inspired by the above results, we introduced a new mixed equilibrium problem with the relaxed monotone mapping and prove the existence of solutions of the mixed equilibrium problem. Then we propose an iterative scheme to find the common element of the set of solutions of the mixed equilibrium problem and the set of fixed points of a quasi--nonexpansive mapping in Banach spaces. In particular, the variational inequality (6) or (7) may be solved by the algorithm proposed in this paper. Our results extend and improve the corresponding ones given by Takahashi and Zembayashi [1], Fang and Huang [3], and Wang et al. [7].

2. Preliminaries

A Banach space is said to be strictly convex if for all with and . It is said to be uniformly convex if for any two sequences and in such that and .

Let be the unit sphere of . A Banach space is said to be smooth provided exists for each . It is said to be uniformly smooth if the limit is attained uniformly for .

Let be the topological dual space of and be the normalized duality mapping from into given by

It is well known that if is uniformly convex, then is uniformly continuous on bounded subsets of and if is uniformly smooth, then is uniformly convex.

Recently, Alber [8] introduced a generalized projection operator in a Banach space with a nonempty closed convex subset , which is an analogue of the metric projection in Hilbert spaces:

let be a function defined by

The generalized projection   is a mapping that assigns to an arbitrary point the minimum point of the functional ; that is, , where is a solution to the minimization problem

The existence and uniqueness of follows from the properties of the function and the strict monotonicity of the mapping (see, e.g., [8–12]).

Let be a smooth, strictly convex, and reflexive Banach space . Then, for all , we have the following [8, 9, 11]:

Let be a mapping from into itself. A point is said to be an asymptotic fixed point of [13] if contains a sequence which converges weakly to such that

The set of asymptotic fixed points of is denoted by . The mapping is said to be relatively nonexpansive [14–16] if

We recall that a mapping is said to be nonexpansive if for all , is said to be -nonexpansive if for all , and is said to be quasi--nonexpansive if

Notice that the class of quasi--nonexpansive mappings is more general than the class of relatively nonexpansive mappings [14–16] which requires the strong restriction that . Some examples of quasi--nonexpansive mappings may be found in [2].

A mapping is said to be closed if for any sequence such that and , then .

The following lemmas are needed for the proof of our main results in next section.

Lemma 2 (see [10]). Let be a uniformly convex and smooth Banach space and let , be two sequences of . If and either or is bounded, then .

Lemma 3 (see [8]). Let be a nonempty closed convex subset of a smooth Banach space and . Then if and only if

Lemma 4 (see [8]). Let be a reflexive, strictly convex, and smooth Banach space, let be a nonempty closed convex subset of and . Then

The following lemma is contained implicitly in Step 1 of Theorem 3.1 of [17].

Lemma 5 (see [17]). Let be a uniformly convex and smooth Banach space, let be a nonempty closed convex subset of , and let be a closed quasi--nonexpansive mapping from into itself. Then is a closed convex subset of .

Lemma 6 (see [18]). Let be a uniformly convex Banach space and let be a closed ball of . Then there exists a continuous strictly increasing convex function with such that for all and with .

3. Main Results

For our main results, we introduce some definitions and lemmas as follows.

Definition 7 (see [3]). Let be a Banach space with the dual space and let be a nonempty subset of . Let and be two mappings. The mapping is said to be -hemicontinuous if, for any fixed , the function defined by is continuous at .

Definition 8. Let be a Banach space with the dual space and let be a nonempty subset of . A mapping is called a KKM mapping if, for any , where denotes the family of all the nonempty subsets of .

Lemma 9 (see [19]). Let be a nonempty subset of a Hausdorff topological vector space and let be a KKM mapping. If is closed in for all in and compact for some , then .

Lemma 10. Let be a reflexive Banach space with the dual space and let be a nonempty closed convex subset of . Let be an -hemicontinuous and relaxed --monotone mapping. Let be a bifunction from to satisfying and and let be a proper convex function from to . Let and . Assume that (i) for all ;(ii)for any fixed , the mapping is convex.
Then the following problems (23) and (24) are equivalent:(I)find such that (II)find such that

Proof. Let be a solution of the problem (23). Since is relaxed - monotone, we have Thus, is a solution of the problem (24).
Conversely, let be a solution of the problem (24) and let be any point with . From (24), it follows that . Letting we have . Since is a solution of the problem (24), it follows that
The convexity of and conditions (i), (ii), (A1), and (A4) imply that
Thus, it follows from (27)-(28) that
Since is -hemicontinuous and , letting in (29), we get for all with . When , the relation is trivial. Therefore, is also a solution of the problem (23). This completes the proof.

Lemma 11. Let be a reflexive Banach space with the dual space and let be a nonempty closed convex bounded subset of . Let be an -hemicontinuous and relaxed --monotone mapping, let be a bifunction from to satisfying and , and let be a proper convex function from to . Let and . Assume that (i) for all ;(ii)for any fixed , the mapping is convex and lower semicontinuous;(iii) is weakly lower semicontinuous; that is, for any net , converges to in implying that . Then the problem (23) is solvable.

Proof. Define two set-valued mappings as follows: respectively.
Now, we claim that is a KKM mapping. If is not a KKM mapping, then there exist and , , such that
By the definition of , we have
It follows that which is a contradiction. This implies that is a KKM mapping.
Now, we prove that
For any given , letting , then
Since is relaxed --monotone, we have which implies that and so
As in the proof of Theorem  2.2 in [3], also, we can obtain
Hence, there exists such that This completes the proof.