In this paper, we introduce a novel iterative scheme called quasi-implicit iterative scheme and study its stability as well as strong convergence for general class of maps in a normed linear space. Further, we proved rate of convergence and gave a numerical example to demonstrate that our iterative scheme is faster than semi- implicit iterative scheme and many more other iterative schemes in this direction.
Agwu,I. and Igbokwe,I. (2021). Strong Convergence Theorems for a General Class of Mapping Via Quasi-implicit Iterative Schemes. Mathematical Analysis and Convex Optimization, 2(2), 93-104. doi: 10.22034/maco.2.2.10
MLA
Agwu,I. , and Igbokwe,I. . "Strong Convergence Theorems for a General Class of Mapping Via Quasi-implicit Iterative Schemes", Mathematical Analysis and Convex Optimization, 2, 2, 2021, 93-104. doi: 10.22034/maco.2.2.10
HARVARD
Agwu I., Igbokwe I. (2021). 'Strong Convergence Theorems for a General Class of Mapping Via Quasi-implicit Iterative Schemes', Mathematical Analysis and Convex Optimization, 2(2), pp. 93-104. doi: 10.22034/maco.2.2.10
CHICAGO
I. Agwu and I. Igbokwe, "Strong Convergence Theorems for a General Class of Mapping Via Quasi-implicit Iterative Schemes," Mathematical Analysis and Convex Optimization, 2 2 (2021): 93-104, doi: 10.22034/maco.2.2.10
VANCOUVER
Agwu I., Igbokwe I. Strong Convergence Theorems for a General Class of Mapping Via Quasi-implicit Iterative Schemes. MACO, 2021; 2(2): 93-104. doi: 10.22034/maco.2.2.10
Mathematical Analysis and Convex Optimization
