 Convergence for a class of improved sixth-order Chebyshev–Halley type methodsXiuhua Wang and Jisheng Kou Applied Mathematics and Computation, 2016, vol. 273, issue C, 513-524 Abstract: In this paper, we consider the semilocal convergence on a class of improved Chebyshev–Halley type methods for solving F(x)=0, where F: Ω ⊆ X → Y is a nonlinear operator, X and Y are two Banach spaces, Ω is a non-empty open convex subset in X. To solve the problems that F ′′′(x) is unbounded in Ω and it can not satisfy the whole Lipschitz or Ho¨lder continuity, ‖F ′′′(x)‖ ≤ N is replaced by ∥F′′′(x0)∥≤N¯, for all x ∈ Ω, where N,N¯≥0,x0 is an initial point. Moreover, F ′′′(x) is assumed to be local Ho¨lder continuous. So the convergence conditions are relaxed. We prove an existence-uniqueness theorem for the solution, which shows that the R-order of these methods is at least 5+q, where q ∈ (0, 1]. Especially, when F ′′′(x) is local Lipschitz continuous, the R-order will become six. Keywords: Chebyshev–Halley type methods; Convergence condition; Nonlinear equations in Banach space; Local Ho¨lder continuous; R-order of convergence (search for similar items in EconPapers) Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:eee:apmaco:v:273:y:2016:i:c:p:513-524 DOI: 10.1016/j.amc.2015.07.058 Access Statistics for this article Applied Mathematics and Computation is currently edited by Theodore Simos More articles in Applied Mathematics and Computation from Elsevier |
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