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Displaying 221 – 240 of 286

Skipping transition conditions in a posteriori error estimates for finite element discretizations of parabolic equations

Stefano Berrone (2010)

ESAIM: Mathematical Modelling and Numerical Analysis

In this paper we derive a posteriori error estimates for the heat equation. The time discretization strategy is based on a θ-method and the mesh used for each time-slab is independent of the mesh used for the previous time-slab. The novelty of this paper is an upper bound for the error caused by the coarsening of the mesh used for computing the solution in the previous time-slab. The technique applied for deriving this upper bound is independent of the problem and can be generalized to other time...

Smoothing effect and discretization in time to semilinear parabolic equations with nonsmooth data

Marián Slodička (1991)

Commentationes Mathematicae Universitatis Carolinae

The purpose of this paper is to derive the error estimates for discretization in time of a semilinear parabolic equation in a Banach space. The estimates are given in the norm of the space $𝕏_{α}$ for $0 < α < 1$ when the initial condition is not regular.

Solution Manifolds and Submanifolds of Parametrized Equations and Their Discretization Errors.

Werner C. Rheinboldt, James P. Fink (1984)

Numerische Mathematik

Solvability of the power flow problem in DC overhead wire circuit modeling

Jakub Ševčík, Lukáš Adam, Jan Přikryl, Václav Šmídl (2021)

Applications of Mathematics

Proper traffic simulation of electric vehicles, which draw energy from overhead wires, requires adequate modeling of traction infrastructure. Such vehicles include trains, trams or trolleybuses. Since the requested power demands depend on a traffic situation, the overhead wire DC electrical circuit is associated with a non-linear power flow problem. Although the Newton-Raphson method is well-known and widely accepted for seeking its solution, the existence of such a solution is not guaranteed. Particularly...

Some iterative methods for solving equilibrium problems and optimization problems.

He, Huimin, Liu, Sanyang, Fan, Qinwei (2010)

Journal of Inequalities and Applications [electronic only]

Some remarks about the monotone inclusion for solutions of nonlinear equations by regula-falsi-like methods

Norbert Schneider (1983)

Aplikace matematiky

First, a result of J. W. Schmidt about the monotone enclosure of solutions of nonlinear equations is generalized. Then an iteration method is considered, which is more effective than other known methods. For this method, monotone enclosure statements are also proved.

Stability and error estimates valid for infinite time, for strongly monotone and infinitely stiff evolution equations

Axelsson, Owe (1986)

Equadiff 6

Stability of the Iteration Method for non Expansive Mappings

Lemaire, B. (1996)

Serdica Mathematical Journal

The general iteration method for nonexpansive mappings on a Banach space is considered. Under some assumption of fast enough convergence on the sequence of (“almost” nonexpansive) perturbed iteration mappings, if the basic method is τ−convergent for a suitable topology τ weaker than the norm topology, then the perturbed method is also τ−convergent. Application is presented to the gradient-prox method for monotone inclusions in Hilbert spaces.

Stable approximations of a minimal surface problem with variational inequalities.

Nashed, M.Zuhair, Scherzer, Otmar (1997)

Abstract and Applied Analysis

Stable approximations of set-valued maps

Jean-Pierre Aubin, Roger J. Wets (1988)

Annales de l'I.H.P. Analyse non linéaire

Stable discretization methods with external approximation schemes.

Verma, Ram U. (1995)

Journal of Applied Mathematics and Stochastic Analysis

Stable evaluation of differential operators and linear and nonlinear multi-scale filtering.

Scherzer, Otmar (1997)

Electronic Journal of Differential Equations (EJDE) [electronic only]

Steepest descent method on a Riemannian manifold: the convex case.

Munier, Julien (2007)

Balkan Journal of Geometry and its Applications (BJGA)

Steffensen Methods for Solving Generalized Equations

Argyros, Ioannis K., Hilout, Saïd (2008)

Serdica Mathematical Journal

2000 Mathematics Subject Classification: 65G99, 65K10, 47H04.We provide a local convergence analysis for Steffensen's method in order to solve a generalized equation in a Banach space setting. Using well known fixed point theorems for set-valued maps [13] and Hölder type conditions introduced by us in [2] for nonlinear equations, we obtain the superlinear local convergence of Steffensen's method. Our results compare favorably with related ones obtained in [11].

Strong convergence theorems of viscosity iterative methods for a countable family of strict pseudo-contractions in Banach spaces.

Wangkeeree, Rabian, Kamraksa, Uthai (2010)

Fixed Point Theory and Applications [electronic only]

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