1. Introduction

Let be a real Banach space with the topological dual space of , let be the pairing between and , let denote the family of all subsets of and let denote the family of all nonempty closed bounded subsets of . We denote by the for all and . Let , and be nonlinear operators, and let be a general -monotone operator such that . We will consider the following nonlinear general -monotone operator equation with multivalued operator.

Find such that and where is a constant and is the proximal mapping associated with the general -monotone operator due to Cui et al. [1].

It is easy to see that the problem (1.1) is equivalent to the problem of finding such that

Example 1.1. If , then the problem (1.1) is equivalent to finding such that and Based on the definition of the proximal mapping , (1.3) can be written as

Example 1.2. If is a single-valued operator, then a special case of the problem (1.3) is to determine element such that where is defined by for all . The problem (1.5) was studied by Xia and Huang [2] when M is a general H-monotone mapping. Further, the problem (1.5) was studied by Peng et al. [3] if , the identity operator, and M is a multivalued maximal monotone mapping.

Example 1.3. If , , and are single-valued operators, and for all , then the problem (1.3) reduces to finding an element such that which was considered by Verma [4, 5].

We note that for appropriate and suitable choices of , , , , , , and , it is easy to see that the problem (1.1) includes a number of quasivariational inclusions, generalized quasivariational inclusions, quasivariational inequalities, implicit quasivariational inequalities, complementarity problems, and equilibrium problems studied by many authors as special cases; see, for example, [4–7] and the references therein.

The study of such types of problems is motivated by an increasing interest to study the behavior and approximation of the solution sets for many important nonlinear problems arising in mechanics, physics, optimization and control, nonlinear programming, economics, finance, regional structural, transportation, elasticity, engineering, and various applied sciences in a general and unified framework. It is well known that many authors have studied a number of nonlinear variational inclusions and many systems of variational inequalities, variational inclusions, complementarity problems, and equilibrium problems by using the resolvent operator technique, which is a very important method to find solutions of variational inequality and variational inclusion problems; see, for example, [1–15] and the references therein.

On the other hand, Verma [4, 5] introduced the concept of -monotone mappings, which generalizes the well-known general class of maximal monotone mappings and originates way back from an earlier work of the Verma [7]. Furthermore, motivated and inspired by the works of Xia and Huang [2], Cui et al. [1] introduced first a new class of general -monotone operators in Banach spaces, studied some properties of general -monotone operator, and defined a new proximal mapping associated with the general -monotone operator.

Inspired and motivated by the research works going on this field, the purpose of this paper is to introduce the new class of nonlinear general -monotone operator equation with multivalued operator. By using Alber's inequalities, Nalder's results, and the new proximal mapping technique, some new perturbed iterative algorithms with mixed errors for solving the nonlinear general -monotone operator equations will be constructed, and applications of general -monotone operators to the approximation-solvability of the nonlinear operator equations in Banach spaces will be studied. The results presented in this paper improve and extend some corresponding results in recent literature.

2. Preliminaries

In this paper, we will use the following definitions and lemmas.

Definition 2.1. Let , , and be single-valued operators. Then (i) is -strongly monotone, if there exists a positive constant such that (ii) is -Lipschitz continuous, if there exists a constant such that (iii) is -strongly accretive if for any , there exist and a positive constant such that where the generalized duality mapping is defined by (iv) is -relaxed cocoercive with respect to , if for all , there exist positive constants and such that

Example 2.2 (see [11, 12]). (1) Consider an -strongly monotone (and hence -expanding) operator . Then is -relaxed cocoercive with respect to .
(2) Very -cocoercive operator is -relaxed cocoercive, while each -strongly monotone mapping is -relaxed cocoercive with respect to .

Remark 2.3. The notion of the cocoercivity is applied in several directions, especially to solving variational inequality problems using the auxiliary problem principle and projection methods [5], while the notion of the relaxed cocoercivity is more general than the strong monotonicity as well as cocoercivity. Several classes of relaxed cocoercive variational inequalities have been studied in [4, 5].

Definition 2.4. A multivalued operator is said to be(i)maximal monotone if, for any , , (ii)-relaxed monotone if, for any , , and , there exists a positive constant such that (iii)--Lipschitz continuous, if there exists a constant such that where is the Hausdorff pseudometric, that is, Note that if the domain of is restricted to closed bounded subsets , then is the Hausdorff metric.

Definition 2.5. A single-valued operator is said to be(i)coercive if (ii)hemicontinuous if, for any fixed , the function is continuous at .
We remark that the uniform convexity of the space means that for any given , there exists such that for all , , and ensure the inequality . The function is called the modulus of the convexity of the space .
The uniform smoothness of the space means that for any given , there exists such that holds. The function defined by is called the modulus of the smoothness of the space .
We also remark that the space is uniformly convex if and only if for all , and it is uniformly smooth if and only if Moreover, is uniformly convex if and only if is uniformly smooth. In this case, is reflexive by the Milman theorem. A Hilbert space is uniformly convex and uniformly smooth. The proof of the following inequalities can be found, for example, in page 24 of Alber [16].

Lemma 2.6. Let be a uniformly smooth Banach space, and let be the normalized duality mapping from into . Then, for all , we have (i);(ii), where .

Definition 2.7. Let be a Banach space with the dual space , be a nonlinear operator, and be a multivalued operator. The map is said to be general -monotone if is -relaxed monotone and holds for every .
This is equivalent to stating that is general -monotone if.
(i) is -relaxed monotone; (ii) is maximal monotone for every .

Remark 2.8. (1) If , that is, is -relaxed monotone, then the general -monotone operators reduce to general -monotone operators (see, e.g., [1, 2]).
(2) If is a Hilbert space, then the general -monotone operator reduces to the -monotone operator in Verma [7]. Therefore, the class of general -monotone operators provides a unifying frameworks for classes of maximal monotone operators, -monotone operators, -monotone operators, and general -monotone operators. For details about these operators, we refer the reader to [1, 2, 7] and the references therein.

Example 2.9. Let be a reflexive Banach space with the dual space , a maximal monotone mapping, and a bounded, coercive, hemicontinuous, and relaxed monotone mapping. Then for any given , it follows from Theorem 3.1 in page 401 of Guo [10] that . This shows that is a general -monotone operator.

Example 2.10 (see [4]). Let be a reflexive Banach space with its dual, and let be -strongly monotone. Let be locally Lipschitz such that is -relaxed monotone. Then is -monotone, which is equivalent to stating that is pseudomonotone (and in fact, maximal monotone).

Lemma 2.11 (see [1]). Let be a reflexive Banach space with the dual space , let be a nonlinear operator, and let be a general -monotone operator. Then the proximal mapping is (i)-Lipschitz continuous when is -strongly monotone with and ;(ii)-Lipschitz continuous if is a strictly monotone operator and is an -strongly monotone operator.

3. Perturbed Algorithms and Convergence

Now we will consider some new perturbed algorithms for solving the nonlinear general -monotone operator equation problem (1.1) or (1.2) by using the proximal mapping technique associated with the general -monotone operators and the convergence of the sequences given by the algorithms.

Lemma 3.1. Let , , , , , and be the same as in (1.1). Then the following propositions are equivalent. (1) is a solution of the problem (1.1), where and .(2) is the fixed-point of the function defined by where is a constant.(3) is a solution of the following equation system: where , and .

Lemma 3.2 (see [17]). Let and be three nonnegative real sequences satisfying the following condition. There exists a natural number such that where , , , . Then .

Algorithm 3.3. Step 1. Choose an arbitrary initial point .Step 2. Take any for Step 3. Choose sequences , , and such that for , are two sequences in and and are error sequences in to take into account a possible inexact computation of the operator point, which satisfies the following conditions: (i); (ii); (iii).Step 4. Let satisfy where is a constant.Step 5. If , , , , , and () satisfy (3.4) to sufficient accuracy, stop; otherwise, set and return to Step 2.

Algorithm 3.4. For any , , compute the iterative sequence by where , , , , and are the same as in Algorithm 3.3.

Theorem 3.5. Let be a uniformly smooth Banach space with for some , and let be the dual space of . Let be -strongly monotone and -Lipschitz continuous, and let be --Lipschitz continuous. Suppose that is -relaxed cocoercive with respect to and -Lipschitz continuous, is -strongly monotone and -Lipschitz continuous, and is general -monotone, where is defined by for all . If, in addition, there exist constants and such that then the following results hold: (1)the solution set of the problem (1.1) is nonempty;(2) the iterative sequence generated by Algorithm 3.3 converges strongly to the solution of the problem (1.1).

Proof. Setting a multivalued function to be the same as (3.1), then we can prove that is a multivalued contractive operator.
In fact, for any and any , there exists such that Note that it follows from Nadler's result [18] that there exists such that Letting then we have . The -strongly monotonicity and -Lipschitz continuity of , the --Lipschitz continuity of , the -relaxed cocoercivity with respect to and -Lipschitz continuity of , and the -Lipschitz continuity of , Lemma 2.6, and the inequality (3.8) imply that Thus, it follows from (3.4) and Lemma 2.11 that where It follows from condition (3.6) that . Hence, from (3.11), we get Since is arbitrary, we obtain . By using same argument, we can prove . It follows from the definition of the Hausdorff metric on that and so is a multivalued contractive mapping. By a fixed-point theorem of Nadler [18], the definition of and (3.2), now we know that has a fixed-point , that is, and there exists such that Hence, it follows from Lemma 3.1 that is a solution of the problem (1.1), that is, the solution set of the problem (1.1) is nonempty.
Next, we prove the conclusion (2). Let be a solution of problem (1.1). Then for all , we have From Algorithm 3.3, the assumptions of the theorem 3.5 and Lemma 2.11, it follows that Combining (3.17) and (3.18), we obtain where is the same as in (3.11). Since , we know that and (3.19) implies Since , it follows from Lemma 3.2 that the sequence strongly converges to . By , , and the -Lipschitz continuity of , we obtain