AbstractLet T:D⊂X→X be an iteration function in a complete metric space X. In this paper we present some new general complete convergence theorems for the Picard iteration xn+1=Txn with order of convergence at least r≥1. Each of these theorems contains a priori and a posteriori error estimates as well as some other estimates. A central role in the new theory is played by the notions of a function of initial conditions of T and a convergence function of T. We study the convergence of the Picard iteration associated to T with respect to a function of initial conditions E:D→X. The initial conditions in our convergence results utilize only information at the starting point x0. More precisely, the initial conditions are given in the form E(x0)∈J...
In this research, we prove strong and weak convergence results for a class of mappings which is much...
summary:In this paper, we obtain some stability results for the Picard iteration process for one and...
[EN] In this paper the semilocal convergence for an alternative to the three steps Newton's method w...
AbstractLet T:D⊂X→X be an iteration function in a complete metric space X. In this paper we present ...
AbstractGeneral local convergence theorems with order of convergence r≥1 are provided for iterative ...
Recent results in local convergence and semi-local convergence analysis constitute a natural framewo...
We present new semilocal and local convergence results for the Newton–Kantorovich method. These new ...
This article is an independently written continuation of an earlier study with the same title [Mathe...
AbstractIn this paper, we extend to Banach spaces the result given by Gander in (Amer. Math. Monthly...
We investigate the local convergence radius of a general Picard iteration in the frame of a real Hil...
In this paper, we extend to Banach spaces the result given by Gander in (Amer. Math. Monthly 92 (198...
Abstract. We present new semilocal convergence theorems for New-ton methods in a Banach space. Using...
Some examples are given to illustarte that the characterization in [8] for the convergence of Picard...
AbstractWe introduce new semilocal convergence theorems for Newton-like methods in a Banach space se...
We present a semilocal convergence for some iterative methods on a Banach space with a convergence s...
In this research, we prove strong and weak convergence results for a class of mappings which is much...
summary:In this paper, we obtain some stability results for the Picard iteration process for one and...
[EN] In this paper the semilocal convergence for an alternative to the three steps Newton's method w...
AbstractLet T:D⊂X→X be an iteration function in a complete metric space X. In this paper we present ...
AbstractGeneral local convergence theorems with order of convergence r≥1 are provided for iterative ...
Recent results in local convergence and semi-local convergence analysis constitute a natural framewo...
We present new semilocal and local convergence results for the Newton–Kantorovich method. These new ...
This article is an independently written continuation of an earlier study with the same title [Mathe...
AbstractIn this paper, we extend to Banach spaces the result given by Gander in (Amer. Math. Monthly...
We investigate the local convergence radius of a general Picard iteration in the frame of a real Hil...
In this paper, we extend to Banach spaces the result given by Gander in (Amer. Math. Monthly 92 (198...
Abstract. We present new semilocal convergence theorems for New-ton methods in a Banach space. Using...
Some examples are given to illustarte that the characterization in [8] for the convergence of Picard...
AbstractWe introduce new semilocal convergence theorems for Newton-like methods in a Banach space se...
We present a semilocal convergence for some iterative methods on a Banach space with a convergence s...
In this research, we prove strong and weak convergence results for a class of mappings which is much...
summary:In this paper, we obtain some stability results for the Picard iteration process for one and...
[EN] In this paper the semilocal convergence for an alternative to the three steps Newton's method w...