![Compact finite-difference method for 2D time-fractional convection–diffusion equation of groundwater pollution problems | Computational and Applied Mathematics Compact finite-difference method for 2D time-fractional convection–diffusion equation of groundwater pollution problems | Computational and Applied Mathematics](https://media.springernature.com/m685/springer-static/image/art%3A10.1007%2Fs40314-020-01169-9/MediaObjects/40314_2020_1169_Fig1_HTML.png)
Compact finite-difference method for 2D time-fractional convection–diffusion equation of groundwater pollution problems | Computational and Applied Mathematics
![PPT - Two-Dimensional Conduction: Shape Factors and Dimensionless Conduction Heat Rates PowerPoint Presentation - ID:2947011 PPT - Two-Dimensional Conduction: Shape Factors and Dimensionless Conduction Heat Rates PowerPoint Presentation - ID:2947011](https://image1.slideserve.com/2947011/2-d-heat-diffusion-equations1-l.jpg)
PPT - Two-Dimensional Conduction: Shape Factors and Dimensionless Conduction Heat Rates PowerPoint Presentation - ID:2947011
![SOLVED: Consider the following two-dimensional convection-diffusion equation: ∂u/∂t = ∂^2u/∂x^2 + ∂u/∂x Obtain an explicit finite difference equation using first-order forward time, first-order forward in space (for the convective term ... SOLVED: Consider the following two-dimensional convection-diffusion equation: ∂u/∂t = ∂^2u/∂x^2 + ∂u/∂x Obtain an explicit finite difference equation using first-order forward time, first-order forward in space (for the convective term ...](https://cdn.numerade.com/ask_images/72395712a9d54afeac34ca090f4f5af1.jpg)
SOLVED: Consider the following two-dimensional convection-diffusion equation: ∂u/∂t = ∂^2u/∂x^2 + ∂u/∂x Obtain an explicit finite difference equation using first-order forward time, first-order forward in space (for the convective term ...
![numpy - Applying Neumann BC on 2D Diffusion Equation on Python using Finite-Difference Method - Stack Overflow numpy - Applying Neumann BC on 2D Diffusion Equation on Python using Finite-Difference Method - Stack Overflow](https://i.stack.imgur.com/rF680.png)
numpy - Applying Neumann BC on 2D Diffusion Equation on Python using Finite-Difference Method - Stack Overflow
![SOLVED: Discretize in space the 2D nonlinear diffusion equation: Otu = V.(D(u)Vu) = Ox(D(u)Oxu) + Oy(D(u)Oyu) with second-order accurate central differences with Ax = Ay = h. Set uij = u(xi, Yj) SOLVED: Discretize in space the 2D nonlinear diffusion equation: Otu = V.(D(u)Vu) = Ox(D(u)Oxu) + Oy(D(u)Oyu) with second-order accurate central differences with Ax = Ay = h. Set uij = u(xi, Yj)](https://cdn.numerade.com/ask_images/4d24fb13ac424c82b2ef39bd64ca29c5.jpg)