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Convergence Theorems on Generalized Equilibrium Problems and Fixed Point Problems with Applications
Journal of Inequalities and Applications volume 2010, Article number: 189036 (2010)
Abstract
The purpose of this work is to introduce an iterative method for finding a common element of a solution set of a generalized equilibrium problem, of a solution set solutions of a variational inequality problem and of a fixed point set of a strict pseudocontraction. Strong convergence theorems are established in the framework of Hilbert spaces.
1. Introduction and Preliminaries
Let 
be a real Hilbert space, 
a nonempty closed and convex subset of 
and 
a nonlinear mapping. Recall the following definitions.
(a)The mapping 
is said to be monotone if
(b)
is said to be 
-strongly monotone if there exists a constant 
such that
(c)
is said to be 
-inverse-strongly monotone if there exists a constant 
such that
The classical variational inequality problem is to find 
such that
In this paper, we use 
to denote the solution set of the problem (1.4). One can easily see that the variational inequality problem is equivalent to a fixed point problem. 
is a solution to the problem (1.4) if and only if 
is a fixed point of the mapping 
, where 
is a constant and 
is the identity mapping.
Let 
be a nonlinear mapping. In this paper, we use 
to denote the fixed point set of 
. Recall the following definitions.
(d)The mapping 
is said to be nonexpansive if
(e)
is strictly pseudocontractive with a constant 
if
For such a case, 
is called a 
-strict pseudocontraction.
(f)
is said to be pseudocontractive if
Clearly, the class of strict pseudocontractions falls into the one between a class of nonexpansive mappings and a class of pseudocontractions.
Recently, many authors considered the problem of finding a common element of the solution set of the variational inequality (1.4) and of fixed point set of a nonexpansive mapping in Hilbert spaces; see, for examples, [1–5] and the references therein.
In 2005, Iiduka and Takahashi [2] obtained the following theorem in a real Hilbert space.
Theorem 1 IT.
Let 
be a closed convex subset of a real Hilbert space 
. Let 
be an 
-inverse-strongly monotone mapping of 
into 
and let 
be a nonexpansive mapping of 
into itself such that 
. Suppose 
and 
is given by
for every 
where 
is a sequence in 
and 
is a sequence in 
. If 
and 
are chosen so that 
for some 
with 
,
then 
converges strongly to 
Let 
be an inverse-strongly monotone mapping, and 
a bifunction of 
into 
, where 
is the set of real numbers. We consider the following equilibrium problem:
In this paper, the set of such 
is denoted by 
, that is,
In the case of 
, the zero mapping, the problem (1.10) is reduced to
In this paper, we use 
to denote the solution set of the problem (1.12), which was studied by many others; see, for examples, [1, 3, 6–23] and the reference therein. In the case of 
, the problem (1.10) is reduced to the classical variational inequality (1.4). The problem (1.10) is very general in the sense that it includes, as special cases, optimization problems, variational inequalities, minimax problems, the Nash equilibrium problem in noncooperative games, and others; see, for instances, [15, 24].
To study the problems (1.10) and (1.12), we may assume that the bifunction 
satisfies the following conditions:
(A1)
for all 
;
(A2)
is monotone, that is, 
for all 
;
(A3)for each 
,
(A4)for each 
, 
is convex and weakly lower semicontinuous.
Recently, S. Takahashi and W. Takahashi [21] considered the problem (1.12) by introducing an iterative method in a Hilbert space. To be more precise, they proved the following theorem.
Theorem 1 TT1.
Let 
be a nonempty closed convex subset of 
. Let 
be a bifunction from 
to 
satisfying (A1)–(A4), and let 
be a nonexpansive mapping of 
into 
such that 
. Let 
be a contraction of 
into itself, and let 
and 
be sequences generated by 
and
where 
and 
satisfy
Then 
and 
converge strongly to 
where 
Very recently, S. Takahashi and W. Takahashi [22] further considered the problem (1.10). Strong convergence theorems of common elements are established. More precisely, they obtained the following result.
Theorem 2 TT2.
Let 
be a closed convex subset of a real Hilbert space 
and let 
be a bifunction satisfying (A1), (A2), (A3) and (A4). Let 
be an 
-inverse-strongly monotone mapping of 
into 
and let 
be a nonexpansive mapping of 
into itself such that 
. Let 
and 
and let 
and 
be sequences generated by
where 
, 
, and 
satisfy
Then, 
converges strongly to 
In this paper, motivated by Theorem IT, Theorem TT1, and Theorem TT2, we introduce a general iterative method for the problem of finding a common element of a solution set of a generalized equilibrium problem (1.10), of a solution set of a variational inequality problem (1.4), and of a fixed point set of a strict pseudocontraction. Strong convergence theorems are established in the framework of Hilbert spaces. The results presented in this paper improve and extend the corresponding results announced by many others.
In order to prove our main results, we need the following lemmas.
The following lemmas can be found in [11, 24].
Lemma 1.1.
Let 
be a nonempty closed convex subset of 
and let 
be a bifunction satisfying (A1)–(A4). Then, for any 
and 
, there exists 
such that
Further, define a mapping 
by
for all 
and 
Then, the following hold.
(1)
is single-valued;
(2)
is firmly nonexpansive, that is, for any 
,
(3)
;
(4)
is closed and convex.
Lemma 1.2 (see [25]).
Let 
be a nonempty closed convex subset of a real Hilbert space 
and 
a 
-strict pseudocontraction. Define 
by 
for each 
. Then, as 
, 
is nonexpansive and 
.
Lemma 1.3 (see [26]).
Let 
and 
be bounded sequences in a Banach space 
and let 
be a sequence in 
with
Suppose that 
for all integers 
and
Then 
The following lemma can be deduced from Bruck [8].
Lemma 1.4.
Let 
be a closed convex subset of a strictly convex Banach space 
. Let 
, 
and 
be three nonexpansive mappings on 
. Suppose 
is nonempty. Let 
, 
and 
be three constant in 
Then the mapping 
on 
defined by
for 
is well defined, nonexpansive, and 
holds.
Lemma 1.5 (see [6]).
Let 
be a real Hilbert space, 
a nonempty closed and convex subset of 
and 
a nonexpansive mapping. Then 
is demiclosed at zero.
Lemma 1.6 (see [14]).
Let 
be a real Hilbert space, 
a nonempty closed and convex subset of 
and 
a 
-strict pseudocontraction. Then 
is closed and convex.
Lemma 1.7 (see [27]).
Assume that 
is a sequence of nonnegative real numbers such that
where 
is a sequence in 
and 
is a sequence such that
(a)
(b)
or 
Then 
2. Main Results
Theorem 2.1.
Let 
be a nonempty closed and convex subset of a real Hilbert space 
and 
a bifunction from 
to 
satisfying (A1)–(A4). Let 
be an 
-inverse-strongly monotone mapping of 
into 
and 
a 
-inverse-strongly monotone mapping of 
into 
. Let 
be a 
-strict pseudocontraction with a fixed point. Assume that 
. Let 
be a sequence in 
generated by
where 
is a fixed element in 
, 
, 
, 
, 
, 
and 
are sequences in 
, 
is sequence in 
, 
and 
. Assume that the above control sequences satisfy the following restrictions
(R1)
(R2)
, 
;
(R3)
(R4)
and 
.
Then the sequence 
defined by the iterative process (2.1) converges strongly to 
.
Proof.
The proof is divided into six steps.
Step 1.
Show that 
is well defined.
From Lemma 1.6, we see that 
is closed and convex. On the other hand, we see that the mapping 
, where 
, is nonexpansive. Indeed, for any 
, we have that
This shows that 
is nonexpansive mapping. Similarly, we can prove that 
, where 
is nonexpansive. It follows that 
, 
is closed and convex. From Lemma 1.1, we see that 
. Since 
is nonexpansive, we obtain that 
is closed and convex. This shows that 
is well defined.
Step 2.
Show that 
is bounded.
Put 
for each 
In view of Lemma 1.2 and (R4), we obtain that 
is nonexpansive and 
. Letting 
, we obtain that
Note that 
for each 
It follows that 
Putting
we have that
It follows that
This shows that the sequence 
is bounded. Note that
This proves that the sequences 
and 
are bounded, too.
Step 3.
Show that 
as 
Note that
where 
is an appropriate constant such that 
. On the other hand, we have
It follows from (2.1) and (2.9) that 
where 
is an appropriate constant such that
Put 
, for each 
, that is,
Now, we compute 
Notice that
It follows that
Substituting (2.10) into (2.14), we arrive at
It follows from the restrictions (R2)–(R4) that
From Lemma 1.3, we obtain that
From (2.12), we see that
In view of (2.17), we get that
Step 4.
Show that 
as 
From the iterative process (2.1), we have
This implies that
It follows from the restrictions (R2) and (R3) that we arrive at
Step 5.
Show that 
where 
To show that, we can choose a sequence 
of 
such that
Since 
is bounded, we see that there exists a subsequence 
of 
which converges weakly to 
. Without loss of generality, we may assume that 
.
Next, we show that 
. In fact, define a mapping 
by
where 
. Note that 
is nonexpansive and 
. From Lemma 1.4, we see that 
is a nonexpansive mapping such that
On the other hand, we have
It follows from the condition (R4) that 
Note that
From (2.22), we arrive at
It follows from Lemma 1.5 that
Thanks to (2.23), we arrive at
Step 6.
Show that 
as 
Notice that
which yields that
In view of the restrictions (R2) and (2.30), we from Lemma 1.7 can conclude the desired conclusion easily. This completes the proof.
As corollaries of Theorem 2.1, we have the following results.
Corollary 2.2.
Let 
be a nonempty closed and convex subset of a real Hilbert space 
and 
a bifunction from 
to 
satisfying (A1)–(A4). Let 
be a 
-inverse-strongly monotone mapping of 
into 
. Let 
be a 
-strict pseudocontraction with a fixed point. Assume that 
. Let 
be a sequence in 
generated by
where 
is a fixed element in 
, 
, 
, 
, 
, 
and 
are sequences in 
, 
is sequence in 
, 
and 
. Assume that the above control sequences satisfy the following restrictions:
(R1)
(R2)
, 
;
(R3)
(R4)
and 
for all 
.
Then the sequence 
defined by the iterative process (2.1) converges strongly to 
.
Proof.
In Theorem 2.1, put 
, the zero mapping. Then for any 
, we see that the the following inequality holds.
Then, we can obtain the desired conclusion easily from Theorem 2.1. This completes the proof.
Corollary 2.3.
Let 
be a nonempty closed and convex subset of a real Hilbert space 
and 
a bifunction from 
to 
satisfying (A1)–(A4). Let 
be a 
-strict pseudocontraction of 
into 
and 
a 
-strict pseudocontraction of 
into 
. Let 
be a 
-strict pseudocontraction with a fixed point. Assume that 
. Let 
be a sequence in 
generated by
where 
is a fixed element in 
, 
, 
, 
, 
, 
and 
are sequences in 
, 
is sequence in 
, 
and 
. Assume that the above control sequences satisfy the following restrictions:
(R1)
(R2)
, 
;
(R3)
(R4)
and 
.
Then the sequence 
defined by the above iterative process converges strongly to 
.
Proof.
Put 
and 
. Then, we see that 
is 
-inverse-strongly monotone and 
is 
-inverse-strongly monotone; see [7]. We have 
and
It is easy to obtain the desired conclusion from Theorem 2.1.
Remark 2.4.
If 
is a contractive mapping and we replace 
by 
in the recursion formula (2.1), we can obtain the so-called viscosity iteration method. We note that all theorems and corollaries of this paper carry over trivially to the so-called viscosity iteration method; see [28] for more details.
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This project is supported by the National Natural Science Foundation of China (no. 10901140).
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Hao, Y., Cho, S. & Qin, X. Convergence Theorems on Generalized Equilibrium Problems and Fixed Point Problems with Applications. J Inequal Appl 2010, 189036 (2010). https://doi.org/10.1155/2010/189036
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DOI: https://doi.org/10.1155/2010/189036