Most of the existing numerical schemes developed to solve Burgers' equation cannot exhibit its correct physical behavior for very small values of viscosity. This difficulty can be overcome by using splitting methods derived for near-integrable system. This class of methods has positive real coefficients and can be used for non-reversible systems such as Burgers' equation. It also has the advantage of being able to account small viscosity in the accuracy. The algorithm is based on the combination of implicit-explicit finite difference schemes to solve each simplified problem and filtering technique to treat nonlinear instability. The resulting algorithm is accurate, efficient and easy to implement. The new numerical results are compared with...
Numerical solutions for Burgers' equation based on the Galerkins' method using cubic B-spl...
This is a chapter on numerical solutions of the Burgers equation given by Ut + eUUx - ? Uxx = 0, a =...
WOS: 000180511400017In this study, for the Burgers' equation which is used a model problem in turbul...
Most of the existing numerical schemes developed to solve Burgers' equation cannot exhibit its corre...
Purpose - The purpose of this paper is to present an approach capable of solving Burgers' equation. ...
WOS: 000292344300004Purpose - The purpose of this paper is to present an approach capable of solving...
We implement new semi-analytic shooting methods for the stationary viscous Burgers' equation by...
WOS: 000362130800034In this work, high order splitting methods have been used for calculating the nu...
International audienceWe present a reduced basis offline/online procedure for viscous Burgers initia...
WOS: 000237866800027Burgers' equation which is one-dimensional non-linear partial differential equat...
In this work we generate the numerical solutions of Burgers' equation by applying the Crank-Nicholso...
We present a reduced basis offline/online procedure for viscous Burgers initial boundary v...
Two new higher-order accurate finite-difference schemes for the numerical solution of boundary-value...
In this article, the Burgers equations are used as a model equation. The Model Burgers equation desc...
Even if numerical simulation of the Burgers' equation is well documented in the literature, a detail...
Numerical solutions for Burgers' equation based on the Galerkins' method using cubic B-spl...
This is a chapter on numerical solutions of the Burgers equation given by Ut + eUUx - ? Uxx = 0, a =...
WOS: 000180511400017In this study, for the Burgers' equation which is used a model problem in turbul...
Most of the existing numerical schemes developed to solve Burgers' equation cannot exhibit its corre...
Purpose - The purpose of this paper is to present an approach capable of solving Burgers' equation. ...
WOS: 000292344300004Purpose - The purpose of this paper is to present an approach capable of solving...
We implement new semi-analytic shooting methods for the stationary viscous Burgers' equation by...
WOS: 000362130800034In this work, high order splitting methods have been used for calculating the nu...
International audienceWe present a reduced basis offline/online procedure for viscous Burgers initia...
WOS: 000237866800027Burgers' equation which is one-dimensional non-linear partial differential equat...
In this work we generate the numerical solutions of Burgers' equation by applying the Crank-Nicholso...
We present a reduced basis offline/online procedure for viscous Burgers initial boundary v...
Two new higher-order accurate finite-difference schemes for the numerical solution of boundary-value...
In this article, the Burgers equations are used as a model equation. The Model Burgers equation desc...
Even if numerical simulation of the Burgers' equation is well documented in the literature, a detail...
Numerical solutions for Burgers' equation based on the Galerkins' method using cubic B-spl...
This is a chapter on numerical solutions of the Burgers equation given by Ut + eUUx - ? Uxx = 0, a =...
WOS: 000180511400017In this study, for the Burgers' equation which is used a model problem in turbul...