Nonlinear matrix equations have many applications in engineering,nano research,control theory etc.In this paper,we propose inversion free variant of the bas
We use fast sweeping method to solve intrinsic eikonal equations defined on the implicit surfaces.The numerical scheme is based on rectangular grid where th
To study gravitational waves,I introduce a new approach to finite element simulation of general relativity.This approach is based on approximating the Weyl
We consider the numerical solutions of a class of nonlinear(nonstandard)Volterra integral equation.These VIEs arise from nonlinear ordinary differential equ
According to the a posteriori error estimator,a bubble placement method and constrained BLMG strategy are applied to solve elliptic problem with discontinuo
In this manuscript we present a simple and efficient approximation for some class of Fourier multiplier operators Tm on the Paley-Wiener spaces Hh,using the
This paper deals with discontinuous finite volume approximations of the distributed optimal control problems governed by a class of semilinear parabolic par
The approximation of an electromagnetic wave propagating through a highly oscillatory medium is challenging.Using standard edge finite elements a very fine