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Approximation error of one finite-difference scheme for the problem of diffraction by a gradient layer by the method of approximating an integral identity, is considered for a boundary value problem involving
A Posteriori Error Estimates for Approximate Solutions to the Obstacle Problem for the $p$ -Laplacian to the problem as well. We do not use any special properties of approximations or numerical methods nor
A Posteriori Error Estimates for Approximate Solutions to the Obstacle Problem for the -Laplacian. The obtained functional relations allow one toestimate the error of any approximate solutions to the problem
Biharmonic Obstacle Problem: Guaranteed and Computable Error Bounds for Approximate Solutions the error identity. One part of this identity characterizes the deviation of the function (approximation
A fast solution method for time dependent multidimensional Schrödinger equations Schrödinger equation. Our approach is based on the approximation of the data by the basis functions introduced
Implicit iteration method of solving linear equations with approximating right-hand member and approximately specified operator on the assumption of existing errors not only in the equation right-hand member but in the operator as well. Error
Approximation of differential eigenvalue problems with a nonlinear dependence on the parameter by the finite-element method with numerical integration. We study the error in the approximate eigenvalues
Uniform Wavelet-Approximation of Singular Integral Equation Solutions, the problem of its approximate solution with obtaining uniform error estimates is very actual. This equation
Fast computation of elastic and hydrodynamic potentials using approximate approximations cubature procedures. We obtain high order approximations up to a small saturation error, which
Fast computation of elastic and hydrodynamic potentials using approximate approximations cubature procedures. We obtain high order approximations up to a small saturation error, which
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