Searched refs:Pe (Results 1 – 3 of 3) sorted by relevance
31 CeedScalar Pe, cfl, wdetJ; in ChildStatsCollection_CflPe() local45 Pe = CalculatePe_2D(s.Y.velocity, context->diffusion_coeff, gijd_mat); in ChildStatsCollection_CflPe()58 Pe = CalculatePe_3D(s.Y.velocity, context->diffusion_coeff, gijd_mat); in ChildStatsCollection_CflPe()65 v[3][i] = wdetJ * Pe; in ChildStatsCollection_CflPe()66 v[4][i] = wdetJ * Square(Pe); in ChildStatsCollection_CflPe()67 v[5][i] = wdetJ * Cube(Pe); in ChildStatsCollection_CflPe()
138 ### Numerics ($\mathrm{Pe}$, $\mathrm{CFL}$)145 \Pe = \frac{\sqrt{\gbar{jk}^{-1} u_j u_k}}{\kappa}163 | $\mean{\Pe}$ | MeanPe |164 | $\mean{\Pe^2}$ | MeanPeSquared |165 | $\mean{\Pe^3}$ | MeanPeCubed |
236 The cell Péclet number is classically defined by $\mathrm{Pe}_h = \lVert \bm u \rVert h / (2 \kappa…240 \mathrm{Pe} = \frac{\lVert \bm u \rVert^2}{\lVert \bm u_{\bm X} \rVert \kappa}.246 \tau = \frac{\xi(\mathrm{Pe})}{\lVert \bm u_{\bm X} \rVert},249 where $\xi(\mathrm{Pe}) = \coth \mathrm{Pe} - 1/\mathrm{Pe}$ approaches 1 at large local Péclet num…313 \tau_{ii} = c_{\tau} \frac{2 \xi(\mathrm{Pe})}{(\lambda_{\max \text{abs}})_i \lVert \nabla_{x_i} \b…