The finite element method explicit scheme for a solution of one problem of surface and ground water combined movement of the semidiscretization
methods with respect to time variable and
finite element
method (FEM) with respect to space
Two-level schemes of Cauchy problem method for solving fractional powers of elliptic operators finite element or discrete approximation space. The main goal is to consider two
different approaches
Identification of nonlinear coefficient in a transport equation observation. The problem is stated as an optimal control problem and solved numerically. Implicit
finite Existence and uniqueness results for an inverse problem for a semilinear equation with final overdetermination. The existence and uniqueness result for this
difference scheme is given. The efficiency of the proposed
method Numerical solution of a source identification problem: Almost coercivity of accuracy
difference schemes are presented for the numerical solution of this problem. Almost coercive
Numerical Solution of a Parabolic Source Identification Problem with Involution and Neumann Condition identification parabolic problem is established. For the approximate solution of the problem, a stable
difference On capacity computation for symmetric polygonal condensersMaking use of two
different analytical–numerical
methods for capacity computation, we obtain
Difficulties faced by Yee's scheme in photonics problemsPopular Yee's scheme for the FDTD
method faces a number of difficulties for problems in layered
New preconditioning and half-sweep accelerated overrelaxation solution for fractional differential equation overrelaxation iterative
method. The proposed
method utilizes unconditionally stable implicit
finite difference