Add to ORKGA stability analysis is given for two classes of odd-even finite-difference schemes, which approximate the two dimensional variable coefficient heat conduction and the Schrödinger problems. Sufficient and necessary stability conditions are derived for the von Neumann stability for the case of constant coefficient problems. The case of variable coefficients is investigated by the discrete energy method
We study the stability of the two-dimensional Lax-Wendroff scheme with a stabilizer that approximate...
Difference schemes for an equation of heat conduction are investigated in the paper aiming at the ob...
A miscellany of results on the nonlinear instability and dynamics of finite difference discretizatio...
A stability analysis is given for two classes of odd-even finite-difference schemes, which approxima...
We consider various finite difference schemes for the first and the second initial‐boundary value pr...
Abstract: A stability criterion for two-layer difference scheme with variable weight multi...
AbstractA comprehensive and systematic study is presented to derive stability properties of various ...
In this paper, we discuss some limitations of the modified equations approach as a tool for stabilit...
In this paper, we discuss some limitations of the modified equations approach as a tool for stabilit...
The construction of finite difference schemes in two dimensions is more ambiguous than in one dimens...
Abstract: At the present paper the stability criterion for two-level operator- difference ...
In the article, a differential scheme is created for the the first-order diffusion equation using th...
We study the stability of the two-dimensional Lax-Wendroff scheme with a stabilizer that approximate...
In the article, a differential scheme is created for the the first-order diffusion equation using th...
We study the stability of the two-dimensional Lax-Wendroff scheme with a stabilizer that approximate...
We study the stability of the two-dimensional Lax-Wendroff scheme with a stabilizer that approximate...
Difference schemes for an equation of heat conduction are investigated in the paper aiming at the ob...
A miscellany of results on the nonlinear instability and dynamics of finite difference discretizatio...
A stability analysis is given for two classes of odd-even finite-difference schemes, which approxima...
We consider various finite difference schemes for the first and the second initial‐boundary value pr...
Abstract: A stability criterion for two-layer difference scheme with variable weight multi...
AbstractA comprehensive and systematic study is presented to derive stability properties of various ...
In this paper, we discuss some limitations of the modified equations approach as a tool for stabilit...
In this paper, we discuss some limitations of the modified equations approach as a tool for stabilit...
The construction of finite difference schemes in two dimensions is more ambiguous than in one dimens...
Abstract: At the present paper the stability criterion for two-level operator- difference ...
In the article, a differential scheme is created for the the first-order diffusion equation using th...
We study the stability of the two-dimensional Lax-Wendroff scheme with a stabilizer that approximate...
In the article, a differential scheme is created for the the first-order diffusion equation using th...
We study the stability of the two-dimensional Lax-Wendroff scheme with a stabilizer that approximate...
We study the stability of the two-dimensional Lax-Wendroff scheme with a stabilizer that approximate...
Difference schemes for an equation of heat conduction are investigated in the paper aiming at the ob...
A miscellany of results on the nonlinear instability and dynamics of finite difference discretizatio...