![Hiroaki Nishikawa on Twitter: "I worked on the active flux scheme in 2016, and it was very interesting to develop a scheme by treating an advective term as a source term. No Hiroaki Nishikawa on Twitter: "I worked on the active flux scheme in 2016, and it was very interesting to develop a scheme by treating an advective term as a source term. No](https://pbs.twimg.com/media/DrcW5aBW4AAbm1b.jpg)
Hiroaki Nishikawa on Twitter: "I worked on the active flux scheme in 2016, and it was very interesting to develop a scheme by treating an advective term as a source term. No
![Numerical Methods and Programming : 1 Dimensional Convection-Diffusion Navier Stokes problem using Finite Volume Method Numerical Methods and Programming : 1 Dimensional Convection-Diffusion Navier Stokes problem using Finite Volume Method](http://2.bp.blogspot.com/-IBW-vw6pJv0/VmQmqbMvPdI/AAAAAAAABss/uC1aze4kVuE/s1600/3.jpg)
Numerical Methods and Programming : 1 Dimensional Convection-Diffusion Navier Stokes problem using Finite Volume Method
![Can someone explain the physical interpretation of both transport by convection and transport by diffusion? Or maybe explaining the difference between the two. Google is no help : r/CFD Can someone explain the physical interpretation of both transport by convection and transport by diffusion? Or maybe explaining the difference between the two. Google is no help : r/CFD](https://i.redd.it/squ7e6rhej911.png)
Can someone explain the physical interpretation of both transport by convection and transport by diffusion? Or maybe explaining the difference between the two. Google is no help : r/CFD
![SOLVED: Consider the following tWo-dimensional convection-diffusion equation: Ou Ou 0*u Cx Ot Ox Obtain an explicit finite difference equation using first-order forward time, first-order forward in space (for the convective term), and SOLVED: Consider the following tWo-dimensional convection-diffusion equation: Ou Ou 0*u Cx Ot Ox Obtain an explicit finite difference equation using first-order forward time, first-order forward in space (for the convective term), and](https://cdn.numerade.com/ask_images/72395712a9d54afeac34ca090f4f5af1.jpg)
SOLVED: Consider the following tWo-dimensional convection-diffusion equation: Ou Ou 0*u Cx Ot Ox Obtain an explicit finite difference equation using first-order forward time, first-order forward in space (for the convective term), and
![SOLVED: Consider the the one-dimensional steady convection-diffusion equation of the form 06 (1) ox ax2 This equation can be solved numerically using finite difference technique. For ex- ample by using forward difference SOLVED: Consider the the one-dimensional steady convection-diffusion equation of the form 06 (1) ox ax2 This equation can be solved numerically using finite difference technique. For ex- ample by using forward difference](https://cdn.numerade.com/ask_images/275b1205fddb4d88b274280faa810570.jpg)
SOLVED: Consider the the one-dimensional steady convection-diffusion equation of the form 06 (1) ox ax2 This equation can be solved numerically using finite difference technique. For ex- ample by using forward difference
![Lecture Objectives: Review discretization methods for advection diffusion equation Accuracy Numerical Stability Unsteady-state CFD Explicit vs. Implicit. - ppt video online download Lecture Objectives: Review discretization methods for advection diffusion equation Accuracy Numerical Stability Unsteady-state CFD Explicit vs. Implicit. - ppt video online download](https://slideplayer.com/slide/6126693/18/images/2/Steady%E2%80%93state+1D+example.jpg)
Lecture Objectives: Review discretization methods for advection diffusion equation Accuracy Numerical Stability Unsteady-state CFD Explicit vs. Implicit. - ppt video online download
![Solving 1-D Linear Convection Using First-Order Backward Difference And Forward Difference Numerical Schemes Using MATLAB Solving 1-D Linear Convection Using First-Order Backward Difference And Forward Difference Numerical Schemes Using MATLAB](https://www.nuclear-power.net/wp-content/uploads/2017/11/Navier-Stokes-Equations-definition.png)