We consider the Bitsadze–Samarskii type nonlocal boundary value problem for Poisson equation in a unit square, which is solved by a difference scheme of second-order accuracy. Using this approximate solution, we correct the right-hand side of the difference scheme. It is shown that the solution of the corrected scheme converges at the rate O(|h|s) in the discrete L2-norm provided that the solution of the original problem belongs to the Sobolev space with exponent s∈[2,4]. Keywords: Nonlocal BVP, Difference scheme, Method of corrections, Improvement of accuracy, Compatible estimates of convergence rat
The first and second orders of accuracy difference schemes for the approximate solutions of the nonl...
AbstractThe second order of accuracy difference scheme for the approximate solutions of the nonlocal...
A third order of accuracy absolutely stable difference schemes is presented for nonlocal boundary va...
AbstractWe consider the Bitsadze–Samarskii type nonlocal boundary value problem for Poisson equation...
AbstractWe consider the Bitsadze–Samarskii type nonlocal boundary value problem for Poisson equation...
Abstract Partial differential equations with nonlocal boundary conditions have been widely applied i...
AbstractA difference scheme is derived for a class of nonlocal parabolic equations with natural boun...
In the present study, first and second order of accuracy difference schemes for the numerical soluti...
In this thesis finite-difference approximations to the three boundary value problems for Poisson’s e...
In the present paper, the second order of accuracy two-step difference scheme for the approximate so...
The aim of this paper is to present finite difference method for numerical solution of singularly pe...
AbstractA nonlocal boundary value problem for hyperbolic-parabolic equations in a Hilbert space H is...
In the present study, a fourth order of accuracy difference scheme for the approximate solution of t...
In this study, nonlocal boundary value Schrödinger type problem in a Hilbert space with the self-adj...
We are interested in studying the stable difference schemes for the numerical solution of the nonloc...
The first and second orders of accuracy difference schemes for the approximate solutions of the nonl...
AbstractThe second order of accuracy difference scheme for the approximate solutions of the nonlocal...
A third order of accuracy absolutely stable difference schemes is presented for nonlocal boundary va...
AbstractWe consider the Bitsadze–Samarskii type nonlocal boundary value problem for Poisson equation...
AbstractWe consider the Bitsadze–Samarskii type nonlocal boundary value problem for Poisson equation...
Abstract Partial differential equations with nonlocal boundary conditions have been widely applied i...
AbstractA difference scheme is derived for a class of nonlocal parabolic equations with natural boun...
In the present study, first and second order of accuracy difference schemes for the numerical soluti...
In this thesis finite-difference approximations to the three boundary value problems for Poisson’s e...
In the present paper, the second order of accuracy two-step difference scheme for the approximate so...
The aim of this paper is to present finite difference method for numerical solution of singularly pe...
AbstractA nonlocal boundary value problem for hyperbolic-parabolic equations in a Hilbert space H is...
In the present study, a fourth order of accuracy difference scheme for the approximate solution of t...
In this study, nonlocal boundary value Schrödinger type problem in a Hilbert space with the self-adj...
We are interested in studying the stable difference schemes for the numerical solution of the nonloc...
The first and second orders of accuracy difference schemes for the approximate solutions of the nonl...
AbstractThe second order of accuracy difference scheme for the approximate solutions of the nonlocal...
A third order of accuracy absolutely stable difference schemes is presented for nonlocal boundary va...