AbstractThe homotopy perturbation method is used to construct a new iteration algorithm for solving nonlinear ill-posed operator equations. Numerical tests are given, showing that the algorithm is more efficient than the well-known Landweber method
AbstractThe homotopy perturbation method is applied to the nonlinear oscillators. Only one iteration...
A successive iteration sequence of positive solution is structured for a singular second‐order quasi...
AbstractIn this work, a reliable approach for convergence of the Adomian method when applied to a cl...
AbstractAn approximation to the exact derivative leads to perturbed fixed slope iterations in the co...
New proofs of existence and uniqueness results for the solution of the Cauchy problem with delay are...
AbstractA Mysovskii-type theorem for Newton's method under (k,p)-Hölder continuous derivative is con...
AbstractThe numerical-analytic method is applied to a class of nonlinear differential-algebraic syst...
We present the semi-local convergence analysis of atwo-step derivative-free method for solving Banac...
AbstractIn this paper, we study the convergence of Gauss–Newton's like method for nonlinear least sq...
AbstractAn iterative method for solving nonlinear functional equations, viz. nonlinear Volterra inte...
In this paper we deal with iterative methods of interpolatory type, for solving nonlinear equations ...
AbstractA new global Kantorovich-type convergence theorem for Newton's method in Banach space is pro...
We present a numerical method for solving nonlinear equation systems, namely Ezquerro-Hern\'{a}ndez ...
This note is to provide a refinement of the convergence analysis of the new exact penalty function m...
AbstractIn the present paper, we study the rate of convergence in simultaneous approximation for the...
AbstractThe homotopy perturbation method is applied to the nonlinear oscillators. Only one iteration...
A successive iteration sequence of positive solution is structured for a singular second‐order quasi...
AbstractIn this work, a reliable approach for convergence of the Adomian method when applied to a cl...
AbstractAn approximation to the exact derivative leads to perturbed fixed slope iterations in the co...
New proofs of existence and uniqueness results for the solution of the Cauchy problem with delay are...
AbstractA Mysovskii-type theorem for Newton's method under (k,p)-Hölder continuous derivative is con...
AbstractThe numerical-analytic method is applied to a class of nonlinear differential-algebraic syst...
We present the semi-local convergence analysis of atwo-step derivative-free method for solving Banac...
AbstractIn this paper, we study the convergence of Gauss–Newton's like method for nonlinear least sq...
AbstractAn iterative method for solving nonlinear functional equations, viz. nonlinear Volterra inte...
In this paper we deal with iterative methods of interpolatory type, for solving nonlinear equations ...
AbstractA new global Kantorovich-type convergence theorem for Newton's method in Banach space is pro...
We present a numerical method for solving nonlinear equation systems, namely Ezquerro-Hern\'{a}ndez ...
This note is to provide a refinement of the convergence analysis of the new exact penalty function m...
AbstractIn the present paper, we study the rate of convergence in simultaneous approximation for the...
AbstractThe homotopy perturbation method is applied to the nonlinear oscillators. Only one iteration...
A successive iteration sequence of positive solution is structured for a singular second‐order quasi...
AbstractIn this work, a reliable approach for convergence of the Adomian method when applied to a cl...
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