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On the Stable Difference Schemes for the Schrödinger Equation with Time Delay are presented. The theorem on stability estimates for the solutions of these difference schemes is established
On the stable difference scheme for the time delay telegraph equation of the difference scheme is established. In applications, stability estimates for the solution of difference schemes
Incomplete Iterative Implicit Schemes schemes are in common use. Their computational implementation is based on solving a discrete elliptic
A STABLE SECOND ORDER OF ACCURACY DIFFERENCE SCHEME FOR A FRACTIONAL SCHRODINGER DIFFERENTIAL EQUATION Louville sense. A stability analysis is performed on the presented difference scheme. Numerical results
On the stability of the telegraph equation with time delay is considered. The main theorem on stability estimates for the solution of this problem is established. As a
Splitting schemes with respect to physical processes for double-porosity poroelasticity problems. The stability of schemes is achieved by switching to three-level explicit-implicit difference scheme with some
A Note on Single-Step Difference Scheme for the Solution of Stochastic Differential Equation differential equations with dependent coefficients. Single step difference schemes generated by exact
Estimating the Domain of Absolute Stability of a Numerical Scheme Based on the Method of Solution Continuation with Respect to a Parameter for Solving Stiff Initial Value Problems of problems, numerical solution schemes are unsuitable because of their insufficient stability. This paper
A note on the elliptic-telegraph identification problem with non-local condition problem are established. Furthermore, stability estimates for the difference schemes of the source
A high order of accuracy of difference schemes for the nonlocal boundary value schrödinger problem on the stability of these difference schemes are established. In application, theorem on the stability
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