Computation of Zeros of Monotone Type Mappings: On Chidume’s Open Problem

Abstract: For $p\geq 2$, let $E$ be a 2-uniformly smooth and $p$-uniformly convex real Banach space and let $A:E\rightarrow E^{\ast }$ be a Lipschitz and strongly monotone mapping such that $A^{-1}(0)\neq \emptyset$. For given $x_{1}\in E$, let $\{x_{n}\}$ be generated by the algorithm $x_{n+1}=J^{-1}(Jx_{n}-\unicode[STIX]{x1D706}Ax_{n})$, $n\geq 1$, where $J$ is the normalized duality mapping from $E$ into $E^{\ast }$ and $\unicode[STIX]{x1D706}$ is a positive real number in $(0,1)$ satisfying suitable conditions. Then… Show more

“…They find application in various contexts, including functional equations, and often emerge as subdifferentials of convex functions in the field of calculus of variations (see, for example, Pascali and Sburian [39] and Rockafellar [41, page 101]). For the solution of the zeros of A, see Mendy et al [ [5], [3], [9], [7], [8], [31]].…”

Algorithm for the solution of Hammerstein integral typ e of equation in a Banach Spaces

“…They find application in various contexts, including functional equations, and often emerge as subdifferentials of convex functions in the field of calculus of variations (see, for example, Pascali and Sburian [39] and Rockafellar [41, page 101]). For the solution of the zeros of A, see Mendy et al [ [5], [3], [9], [7], [8], [31]].…”

Algorithm for the solution of Hammerstein integral typ e of equation in a Banach Spaces

“…Some existing results proved a strong convergence theorem for nonlinear equations of the monotone type, with the assumption of existence of a real constant whose calculation is unclear (see, e.g., Aibinu and Mewomo [4], Chidume et al [10], and Diop et al [11]). Monotone-type mappings occur in many functional equations, and the research on monotone type mappings has recently attracted much attention (see, e.g., Shehu [12,13], Chidume et al [14], Djitte et al [15], Tang [16], Uddin et al [17], Chidume and Idu [18], and Aibinu and Mewomo [19]).…”

Algorithm for Solutions of Nonlinear Equations of Strongly Monotone Type and Applications to Convex Minimization and Variational Inequality Problems

“…where ω is the zero vector in H. We denote the solution of the problem (1.8) by S(M, A). If ω = A then, problem (1.8) becomes the inclusion problem by Rockafellar [16].Further readings on Zeros of inclusion problem (See [17], [18], [19], [8], [12])…”

Modified Viscosity Iterative Algorithm for Solving Variational Inclusion and Fixed Point Problems in Real Hilbert Space