We derive an analytical approach to the Strang splitting method for the Burgers-Huxley equation (BHE) ut+αuux-ε uXX=β(1-u)(u-γ)u. We proved that Srtang splitting method has a second order convergence in Hs(R), where Hs(R) is the Sobolev space and s is an arbitrary nonnegative integer. We numerically solve the BHE by Strang splitting method and compare the results with the reference solution
AbstractWe introduce a splitting method for the semilinear Schrödinger equation and prove its conver...
summary:We consider a Strang-type splitting method for an abstract semilinear evolution equation $$ ...
We investigate the Lie and the Strang splitting for the cubic nonlinear Schrödinger equation on the ...
We provide an error analysis of operator splitting for equations of the type ut = Au + uux where A i...
In this paper, we discuss iterative and noniterative splitting methods, in theory and application, t...
Abstract In this work, high order splitting methods have been used for calculating the numerical sol...
In this paper we consider a splitting method for the augmented Burgers equation and prove that it is...
In this work, high order splitting methods have been used for calculating the numerical solutions of...
We propose and analyze a Strang splitting method for a cubic semilinear Schrödinger equation with fo...
In the present paper, two effective numerical schemes depending on a second-order Strang splitting t...
Operator splitting methods combined with finite element spatial discretizations are studied for time...
Operator splitting methods combined with finite element spatial discretizations are studied for time...
We study the Strang splitting scheme for quasilinear Schrödinger equations. We establish the converg...
We discuss numerical quadratures in one and two dimensions, which is followed by a discussion regard...
We analyze the qualitative properties and the order of convergence of a splitting scheme for a class...
AbstractWe introduce a splitting method for the semilinear Schrödinger equation and prove its conver...
summary:We consider a Strang-type splitting method for an abstract semilinear evolution equation $$ ...
We investigate the Lie and the Strang splitting for the cubic nonlinear Schrödinger equation on the ...
We provide an error analysis of operator splitting for equations of the type ut = Au + uux where A i...
In this paper, we discuss iterative and noniterative splitting methods, in theory and application, t...
Abstract In this work, high order splitting methods have been used for calculating the numerical sol...
In this paper we consider a splitting method for the augmented Burgers equation and prove that it is...
In this work, high order splitting methods have been used for calculating the numerical solutions of...
We propose and analyze a Strang splitting method for a cubic semilinear Schrödinger equation with fo...
In the present paper, two effective numerical schemes depending on a second-order Strang splitting t...
Operator splitting methods combined with finite element spatial discretizations are studied for time...
Operator splitting methods combined with finite element spatial discretizations are studied for time...
We study the Strang splitting scheme for quasilinear Schrödinger equations. We establish the converg...
We discuss numerical quadratures in one and two dimensions, which is followed by a discussion regard...
We analyze the qualitative properties and the order of convergence of a splitting scheme for a class...
AbstractWe introduce a splitting method for the semilinear Schrödinger equation and prove its conver...
summary:We consider a Strang-type splitting method for an abstract semilinear evolution equation $$ ...
We investigate the Lie and the Strang splitting for the cubic nonlinear Schrödinger equation on the ...