Argyros, I.K.George, S.2026-02-052017Journal of Nonlinear Functional Analysis, 2017, 2017, , pp. -https://doi.org/10.23952/jnfa.2017.21https://idr.nitk.ac.in/handle/123456789/25757We present a semilocal convergence analysis for Broyden's method with regularly continuous divided differences in a Banach/Hilbert space setting. By using: center-Lipschitz-type conditions defining restricted convergence domains, at least as weak hypotheses and the same computational cost as in [6] we provide a new convergence analysis for Broyden's method with the following advantages: larger convergence domain; finer error bounds on the distances involved, and at least as precise information on the location of the solution. © 2017 Journal of Nonlinear Functional Analysis.Banach spacesBroyden's methodComputational costsConvergence analysisConvergence domainsDivided differenceError boundMajorizing sequencesSemi-local convergencesError analysis