A local convergence analysis of Inexact Newton’s method with relative residual error toler-ance for finding a singularity of a differentiable vector field defined on a complete Riemannian manifold, based on majorant principle, is presented in this paper. We prove that under local assumptions, the inexact Newton method with a fixed relative residual error tolerance converges Q-linearly to a singularity of the vector field under consideration. Using this result we show that the inexact Newton method to find a zero of an analytic vector field can be implemented with a fixed relative residual error tolerance. In the absence of errors, our analysis retrieve the classical local theorem on the Newton method in Riemannian context
We consider the problem of finding a singularity of a vector field $X$ on a complete Riemannian mani...
AbstractNewton's method for finding a zero of a vectorial function is a powerful theoretical and pra...
Abstract The estimates of the radii of convergence balls of the Newton method and uniqueness balls o...
We present a local convergence analysis of inexact Newton method for solving singular systems of equ...
In this chapter we study of the Inexact Newton Method in order to solve problems on a Riemannian Man...
AbstractWe prove that under semi-local assumptions, the inexact Newton method with a fixed relative ...
AbstractA local convergence analysis of inexact Newton-type methods using a new type of residual con...
A robust affine invariant version of Kantorovich’s theorem on Newton’s method, for finding a zero of...
In this paper we give local convergence results of an inexact Newton-type method for monotone equati...
We study the local convergence properties of inexact Newton-Gauss method for singular systems of equ...
AbstractUnder weak Lipschitz condition, local convergence properties of inexact Newton methods and N...
Abstract. We provide a local convergence analysis of inexact Newton–like methods in a Banach space s...
Using more precise majorizing sequences than before [1], [8], and under the same computational cost,...
Abstract. Inexact Newton methods for finding a zero of F 1 1 are variations of Newton’s method in wh...
We study the convergence properties for some inexact Newton-like methods including the inexact Newto...
We consider the problem of finding a singularity of a vector field $X$ on a complete Riemannian mani...
AbstractNewton's method for finding a zero of a vectorial function is a powerful theoretical and pra...
Abstract The estimates of the radii of convergence balls of the Newton method and uniqueness balls o...
We present a local convergence analysis of inexact Newton method for solving singular systems of equ...
In this chapter we study of the Inexact Newton Method in order to solve problems on a Riemannian Man...
AbstractWe prove that under semi-local assumptions, the inexact Newton method with a fixed relative ...
AbstractA local convergence analysis of inexact Newton-type methods using a new type of residual con...
A robust affine invariant version of Kantorovich’s theorem on Newton’s method, for finding a zero of...
In this paper we give local convergence results of an inexact Newton-type method for monotone equati...
We study the local convergence properties of inexact Newton-Gauss method for singular systems of equ...
AbstractUnder weak Lipschitz condition, local convergence properties of inexact Newton methods and N...
Abstract. We provide a local convergence analysis of inexact Newton–like methods in a Banach space s...
Using more precise majorizing sequences than before [1], [8], and under the same computational cost,...
Abstract. Inexact Newton methods for finding a zero of F 1 1 are variations of Newton’s method in wh...
We study the convergence properties for some inexact Newton-like methods including the inexact Newto...
We consider the problem of finding a singularity of a vector field $X$ on a complete Riemannian mani...
AbstractNewton's method for finding a zero of a vectorial function is a powerful theoretical and pra...
Abstract The estimates of the radii of convergence balls of the Newton method and uniqueness balls o...