Symmetries are vital in the study of physical phenomena such as quantum physics and the micro-world, among others. Then, these phenomena reduce to solving nonlinear equations in abstract spaces. These equations in turn are mostly solved iteratively. That is why the objective of this paper was to obtain a uniform way to study three-step iterative methods to solve equations defined on Banach spaces. The convergence is established by using information appearing in these methods. This is in contrast to earlier works which relied on derivatives of the higher order to establish the convergence. The numerical example completes this paper
AbstractThe convergence of iterative methods for solving nonlinear operator equations in Banach spac...
We connect the F iteration process with the class of generalized α-nonexpansive mappings. Under some...
In this paper we present the geometrical interpretation of several iterative methods to solve a nonl...
A plethora of quantum physics problems are related to symmetry principles. Moreover, by using symmet...
Solving nonlinear equations in Banach spaces (real or complex nonlinear equations, nonlinear systems...
Numerous three-step methods of high convergence order have been developed to produce sequences appro...
In the present paper, we study the local convergence analysis of a fifth convergence order method co...
Symmetries play an important role in the study of a plethora of physical phenomena, including the st...
Abstract approved (P. M. Anselone) In 1964, Zarantonello published a constructive method for the sol...
Symmetries play a vital role in the study of physical systems. For example, microworld and quantum p...
We study the local convergence analysis of a fifth order method and its multi-step version in Banach...
We present a semilocal convergence analysis of a third order method for approximating a locally uniq...
A plethora of sufficient convergence criteria has been provided for single-step iterative methods to...
We present a semilocal convergence analysis of a third order method for approximating a locally uniq...
A family of third-order iterative processes (that includes Chebyshev and Halley's methods) is studie...
AbstractThe convergence of iterative methods for solving nonlinear operator equations in Banach spac...
We connect the F iteration process with the class of generalized α-nonexpansive mappings. Under some...
In this paper we present the geometrical interpretation of several iterative methods to solve a nonl...
A plethora of quantum physics problems are related to symmetry principles. Moreover, by using symmet...
Solving nonlinear equations in Banach spaces (real or complex nonlinear equations, nonlinear systems...
Numerous three-step methods of high convergence order have been developed to produce sequences appro...
In the present paper, we study the local convergence analysis of a fifth convergence order method co...
Symmetries play an important role in the study of a plethora of physical phenomena, including the st...
Abstract approved (P. M. Anselone) In 1964, Zarantonello published a constructive method for the sol...
Symmetries play a vital role in the study of physical systems. For example, microworld and quantum p...
We study the local convergence analysis of a fifth order method and its multi-step version in Banach...
We present a semilocal convergence analysis of a third order method for approximating a locally uniq...
A plethora of sufficient convergence criteria has been provided for single-step iterative methods to...
We present a semilocal convergence analysis of a third order method for approximating a locally uniq...
A family of third-order iterative processes (that includes Chebyshev and Halley's methods) is studie...
AbstractThe convergence of iterative methods for solving nonlinear operator equations in Banach spac...
We connect the F iteration process with the class of generalized α-nonexpansive mappings. Under some...
In this paper we present the geometrical interpretation of several iterative methods to solve a nonl...