AbstractUnder the hypotheses that nonlinear operators have (K, p)-Hölder-type continuous derivatives, exact estimates of the radius of the convergence ball of Newton's method and of the uniqueness ball of solution of equations are obtained
Abstract. The convergence of the King-Werner method for finding zeros of nonlinear operators is anal...
AbstractThe famous Newton–Kantorovich hypothesis has been used for a long time as a sufficient condi...
AbstractHistorical developments in convergence theory as well as error estimates for Newton's method...
Under the hypotheses that a function and its Frechet derivative satisfy some generalized Newton-Myso...
Abstract The estimates of the radii of convergence balls of the Newton method and uniqueness balls o...
We study Newton's method for determining the solution of f(x) = 0 when f(x) is required only to be c...
Under the hypotheses that a function and its Fréchet derivative satisfy some generalized Newton...
We study the local convergence of a Newton-like method of convergence order six to approximate a loc...
AbstractThe present paper is concerned with the convergence problem of Newton's method to solve sing...
AbstractThe generalized radius and center Lipschitz conditions with L average are introduced to inve...
The convergence properties of Newton’s method for systems of equations with constant rank derivative...
AbstractA new semilocal convergence theorem for Newton's method is established for solving a nonline...
Abst ract--The generalized radius and center Lipschitz conditions with L average are introduced to i...
A new semilocal convergence theorem for Newton's method is established for solving a nonlinear equat...
Symmetries play an important role in the study of a plethora of physical phenomena, including the st...
Abstract. The convergence of the King-Werner method for finding zeros of nonlinear operators is anal...
AbstractThe famous Newton–Kantorovich hypothesis has been used for a long time as a sufficient condi...
AbstractHistorical developments in convergence theory as well as error estimates for Newton's method...
Under the hypotheses that a function and its Frechet derivative satisfy some generalized Newton-Myso...
Abstract The estimates of the radii of convergence balls of the Newton method and uniqueness balls o...
We study Newton's method for determining the solution of f(x) = 0 when f(x) is required only to be c...
Under the hypotheses that a function and its Fréchet derivative satisfy some generalized Newton...
We study the local convergence of a Newton-like method of convergence order six to approximate a loc...
AbstractThe present paper is concerned with the convergence problem of Newton's method to solve sing...
AbstractThe generalized radius and center Lipschitz conditions with L average are introduced to inve...
The convergence properties of Newton’s method for systems of equations with constant rank derivative...
AbstractA new semilocal convergence theorem for Newton's method is established for solving a nonline...
Abst ract--The generalized radius and center Lipschitz conditions with L average are introduced to i...
A new semilocal convergence theorem for Newton's method is established for solving a nonlinear equat...
Symmetries play an important role in the study of a plethora of physical phenomena, including the st...
Abstract. The convergence of the King-Werner method for finding zeros of nonlinear operators is anal...
AbstractThe famous Newton–Kantorovich hypothesis has been used for a long time as a sufficient condi...
AbstractHistorical developments in convergence theory as well as error estimates for Newton's method...