6533b822fe1ef96bd127ce45

RESEARCH PRODUCT

On the local and semilocal convergence of a parameterized multi-step Newton method

Null AmatNull ArgyrosNull BusquierNull Hernández-verónNull Yañez0000-0002-6206-1971

subject

Partial differential equationDiscretizationIterative methodApplied MathematicsParameterized complexity010103 numerical & computational mathematics01 natural sciencesIntegral equation010101 applied mathematicsComputational Mathematicssymbols.namesakeOrdinary differential equationConvergence (routing)symbolsApplied mathematics0101 mathematicsNewton's methodMathematics

description

Abstract This paper is devoted to a family of Newton-like methods with frozen derivatives used to approximate a locally unique solution of an equation. We perform a convergence study and an analysis of the efficiency. This analysis gives us the opportunity to select the most efficient method in the family without the necessity of their implementation. The method can be applied to many type of problems, including the discretization of ordinary differential equations, integral equations, integro-differential equations or partial differential equations. Moreover, multi-step iterative methods are computationally attractive.

yearjournalcountryeditionlanguage
2020-10-01
10.1016/j.cam.2020.112843https://investigacion.unirioja.es/documentos/5e9f145229995274079525cb