R.P. Agarwal scite author profile

In this paper, we study the third order semilocal convergence of the Newton-like method for finding the approximate solution of nonlinear operator equations in the setting of Banach spaces. First, we discuss the convergence analysis under ω-continuity condition, which is weaker than the Lipschitz and Hölder continuity conditions. Second, we apply our approach to solve Fredholm integral equations, where the first derivative of involved operator not necessarily satisfy the Hölder and Lipschitz continuity conditions. Finally, we also prove that the R-order of the method is 2p + 1 for any p $\in$ (0,1].

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R.P. Agarwal

Oscillation of higher-order nonlinear difference equations of neutral type

Quadratic Forms and Nonlinear Non-Resonant Singular Second Order Boundary Value Problems of Limit Circle Type

On the Oscillation of Certain Functional Differential Equations

Global Attractivity of Solutions of Nonlinear Functional Integral Equations in Two Variables

A Third Order Newton-Like Method and Its Applications

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