An Analysis upon Some Approximation of Fixed Points through Iterative Methods | Original Article
In this article, we manage iterative methods for approximation of fixed points and their applications. We initially talk about fixed point theorems for a non-expansive mapping or a group of non-expansive mappings. Specifically, we express a fixed point hypothesis which addressed certifiably a problem posed during the Conference on Fixed Point Theory. We manage weak and strong union theorems of Mann's compose and Halpern's write in a Banach space. At last, utilizing these results, we consider the plausibility problem by raised blends of non-expansive withdrawals and the curved minimization problem of finding a minimizer of an arched function.