Abstract

We investigate an algorithm for a common point of fixed points of a finite family of Lipschitz pseudocontractive mappings and solutions of a finite family of γ-inverse strongly accretive mappings. Our theorems improve and unify most of the results that have been proved in this direction for this important class of nonlinear mappings.

1. Introduction

Let be a subset of a real Hilbert space . Let be a nonlinear mapping. The variational inequality problem for and is to

The set of solutions of variational inequality problem is denoted by ; that is,

It is well known that variational inequality theory has emerged as an important tool in studying a wide class of numerous problems in variational inequalities, minimax problems, optimization, physics, and the Nash equilibrium problems in noncooperative games. Several numerical methods have been developed for solving variational inequalities and related optimization problems; see, for instance, [1–5] and the references therein.

A mapping is said to be -inverse strongly accretive (or -inverse strongly monotone) if there exists a positive real number such that

If is -inverse strongly accretive, then inequality (3) implies that is Lipschitzian with constant ; that is, , for all . If in (3) we have that , then is called accretive (or monotone).

Let be a closed and convex subset of a real Hilbert space . A mapping is called a contraction mapping if there exists such that for all . If , then is called nonexpansive. A mapping is called -strictly pseudocontractive of Browder-Petryshyn type [6] if and only if there exists such that is called pseudocontractive if

We note that inequalities (4) and (5) can be equivalently written as for some and respectively. We remark that is pseudocontractive if and only if is accretive. A point is a fixed point of if and we denote by the set of fixed points of ; that is, .

We observe that in a real Hilbert space a class of pseudocontractive mappings includes the class of -strictly pseudocontractive mappings and hence the classes of nonexpansive and contraction mappings.

Closely related to the variational inequality problems is the problem of finding fixed points of nonexpansive mappings, -strict pseudocontraction mappings or pseudocontractive mappings which is the current interest in functional analysis. Several researchers considered a unified approach that approximates a common point of fixed point of nonlinear problems and solutions of variational inequality problems and solutions of variational inequality problems; see, for example, [7–18] and the references therein.

In [19], Takahashi and Toyoda studied the problem of finding a common point of fixed points of a nonexpansive mapping and solutions of a variational inequality problem (1) by considering the following iterative algorithm: where is a sequence in , is a positive sequence, is a nonexpansive mapping, and is an -inverse strongly accretive mapping. They showed that the sequence generated by (8) converges weakly to some provided that the control sequences satisfy some restrictions.

Iiduka and Takahashi [20] reconsidered the common element problem via the following iterative algorithm: where is a nonexpansive mapping, is a -inverse-strongly accretive mapping, is a sequence in , and is a sequence in . They proved that the sequence strongly converges to some point .

Recently, Zegeye and Shahzad [21] investigated the problem of finding a common point of fixed points of a Lipschitz pseudocontractive mapping and solutions of a variational inequality problem for -inverse strongly accretive mapping by considering the following iterative algorithm: where is a metric projection from onto and are in satisfying certain conditions. Then, they proved that the sequence converges strongly to the minimum-norm point of .

A natural question arises whether we can obtain an iterative scheme which converges strongly to a common point of fixed points of a finite family of pseudocontractive mappings and solutions of a finite family of variational inequality problems for -inverse strongly accretive mappings or not.

It is our purpose in this paper to introduce an algorithm and prove that the algorithm converges strongly to a common point of fixed points of a finite family of Lipschitz pseudocontractive mappings and solutions of a finite family of variational inequality problems for -inverse strongly accretive mappings. The results obtained in this paper improve and extend the results of Takahashi and Toyoda [19], Iiduka and Takahashi [20], and Zegeye and Shahzad [21], Theorem 3.2 of Yao et al. [22], and some other results in this direction.

2. Preliminaries

In what follows we will make use of the following lemmas.

Lemma 1. Letting be a real Hilbert space, the following identity holds:

Lemma 2 (see [23]). Let be a nonempty closed and convex subset of a real Hilbert space . Let be a -inverse strongly accretive mapping. Then, for , the mapping is nonexpansive.

Lemma 3 (see [24]). Let be a nonempty, closed, and convex subset of a smooth Banach space . Let be a sunny nonexpansive retraction from onto and let be an accretive operator of into . Then for all ,

Lemma 4 (see [25]). Let be a nonempty, closed, and convex subset of a real Hilbert space . Let , , be nonexpansive mappings such that . Let with . Then is nonexpansive and .

Lemma 5 (see [26]). Let be a convex subset of a real Hilbert space . Let . Then if and only if

Lemma 6 (see [27]). Let be a closed convex subset of a real Hilbert space and be a continuous pseudo-contractive mapping. Then, for , the mapping is nonexpansive(i) is a closed convex subset of ;(ii) is demiclosed at zero; that is, if is a sequence in such that and , as , then .

Lemma 7 (see [28]). Let be a real Hilbert space. Then for all and for such that the following equality holds:

Lemma 8 (see [29]). Let be sequences of real numbers such that there exists a subsequence of such that for all . Then there exists an increasing sequence such that and the following properties are satisfied by all (sufficiently large) numbers :
In fact, is the largest number in the set such that the condition holds.

Lemma 9 (see [30]). Let be a sequence of nonnegative real numbers satisfying the following relation: where and satisfying the following conditions: , and . Then, .

3. Main Result

For the rest of this paper, let , for some , and , for some , satisfy () ; () ; and () .

Theorem 10. Let be a nonempty, closed, and convex subset of a real Hilbert space . Let , , be Lipschitz pseudocontractive mappings with Lipschitz constants , respectively. Let , for , be -inverse strongly accretive mappings. Let be a contraction with constant . Assume that is nonempty. Let a sequence be generated from an arbitrary by where and , for , for with and , for . Then, converges strongly to a point which is the unique solution of the variational inequality for all .

Proof. From Lemmas 2, 4, and 3 we get that is nonexpansive mapping with . Let . Then from (17), (5), and Lemma 7 we have that
Now, substituting (18) in (19) we get that
Moreover, from (17), Lemma 7, and Lipschitz property of we get that
Substituting (21) into (20) we obtain that
But, from the hypothesis we have that and hence inequality (22) gives that
But we have that
Substituting (25) into (24) we get that
Therefore, by induction we get that which implies that and hence are bounded.
Let . Then, from (17), Lemmas 1 and 7, and the methods used to get (22) we obtain that which implies that
But
Thus, substituting (31) in (30) we obtain that
Next, we consider two cases.
Case 1. Suppose that there exists such that is decreasing for all . Then, we get that is convergent. Thus, from (29) and (23) we have that
Furthermore, from (17) and (33) we obtain that and hence Lipschitz continuity of , (34), and (33) implies that
Thus, from (33) and (35) we have that
Therefore, , as , for all , and hence as , for all .
Now, since is bounded subset of , we can choose a subsequence of such that and . Then, from (37) and Lemma 6 we have that , for each . Hence, .
In addition, since is nonexpansive, from Lemma 6 we get that and hence by Lemmas 4 and 3 we obtain that , for each .
Therefore, by Lemma 5, we immediately obtain that