1 | % $Id: numerics_bc.tex 915 2012-05-30 15:11:11Z suehring $ |
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2 | \input{header_tmp.tex} |
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3 | %\input{header_lectures.tex} |
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4 | |
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5 | \usepackage[utf8]{inputenc} |
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6 | \usepackage{ngerman} |
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7 | \usepackage{pgf} |
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8 | \usetheme{Dresden} |
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9 | \usepackage{subfigure} |
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10 | \usepackage{units} |
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11 | \usepackage{multimedia} |
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12 | \usepackage{hyperref} |
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13 | \newcommand{\event}[1]{\newcommand{\eventname}{#1}} |
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14 | \usepackage{xmpmulti} |
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15 | \usepackage{tikz} |
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16 | \usetikzlibrary{shapes,arrows,positioning} |
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17 | \def\Tiny{\fontsize{4pt}{4pt}\selectfont} |
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18 | \usepackage{amsmath} |
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19 | \usepackage{amssymb} |
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20 | \usepackage{multicol} |
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21 | \usepackage{pdfcomment} |
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22 | |
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23 | \institute{Institut fÌr Meteorologie und Klimatologie, Leibniz UniversitÀt Hannover} |
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24 | \date{last update: \today} |
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25 | \event{PALM Seminar} |
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26 | \setbeamertemplate{navigation symbols}{} |
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27 | |
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28 | \setbeamertemplate{footline} |
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29 | { |
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30 | \begin{beamercolorbox}[rightskip=-0.1cm]& |
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31 | {\includegraphics[height=0.65cm]{imuk_logo.pdf}\hfill \includegraphics[height=0.65cm]{luh_logo.pdf}} |
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32 | \end{beamercolorbox} |
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33 | \begin{beamercolorbox}[ht=2.5ex,dp=1.125ex, |
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34 | leftskip=.3cm,rightskip=0.3cm plus1fil]{title in head/foot} |
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35 | {\leavevmode{\usebeamerfont{author in head/foot}\insertshortauthor} \hfill \eventname \hfill \insertframenumber \; / \inserttotalframenumber} |
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36 | \end{beamercolorbox} |
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37 | \begin{beamercolorbox}[colsep=1.5pt]{lower separation line foot} |
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38 | \end{beamercolorbox} |
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39 | } |
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40 | %\logo{\includegraphics[width=0.3\textwidth]{luhimuk_logo.pdf}} |
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41 | |
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42 | \title[Numerics and Boundary Conditions]{Numerics and Boundary Conditions\\ |
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43 | (used in PALM) |
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44 | } |
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45 | \author{Siegfried Raasch} |
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46 | |
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47 | \begin{document} |
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48 | |
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49 | % Folie 1 |
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50 | \begin{frame} |
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51 | \titlepage |
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52 | \end{frame} |
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53 | |
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54 | % Folie 2 |
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55 | \begin{frame} |
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56 | \frametitle{Overview} |
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57 | \scriptsize PALM is (almost) using simple, standard and fast numerical schemes: |
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58 | \begin{itemize} |
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59 | \scriptsize |
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60 | \item<2-> \textbf{Spatial and temporal discretization by finite differences}\\ |
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61 | \item<3-> \textbf{Explicit timestep methods:}\\ |
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62 | - Euler\\ |
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63 | - Leapfrog\\ |
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64 | - \underline{Runge-Kutta}, second or \underline{third order} |
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65 | \item<4-> \textbf{Advection method}\\ |
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66 | - Upstream\\ |
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67 | - Piacsek-Williams (second order central finite differences)\\ |
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68 | - Upstream-spline\\ |
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69 | - Bott-Chlond-scheme (monotone, positiv definit, for scalars only)\\ |
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70 | - \underline{5th-order scheme of Wicker and Skamarock}, (as used in WRF model) |
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71 | \item<5-> \textbf{Poisson-equation for pressure}\\ |
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72 | - \underline{Direct FFT-method}\\ |
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73 | - Multigrid-method |
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74 | \item<6-> \textbf{Lagrangian particle model included} |
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75 | \item<7-> \textbf{Boundary conditions:}\\ |
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76 | - \underline{Cyclic} and non-cyclic horizontal boundary conditions\\ |
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77 | - Surface layer with Monin-Obukhov similarity\\ |
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78 | - Topography\\ |
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79 | - Turbulent inflow (for non-cyclic horizontal boundary conditions) |
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80 | |
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81 | \end{itemize} |
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82 | \end{frame} |
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83 | |
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84 | |
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85 | \section{Numerics} |
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86 | \subsection{Numerics} |
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87 | |
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88 | % Folie 3 |
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89 | \begin{frame} |
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90 | \frametitle{Numerical Grid} |
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91 | \footnotesize |
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92 | \vspace{2mm} |
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93 | \includegraphics[width=\textwidth]{numerics_bc_figures/numerical_grid.png} |
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94 | \begin{itemize} |
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95 | \item<1->Equations are spatially discretized on an Arakawa-C grid. |
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96 | \item<2->All scalar variables s (e.g. , $p^*$, $e$, $K_{\mathrm{m}}$, |
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97 | $K_{\mathrm{h}}$) are defined at the cell centers. |
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98 | \item<3->Velocity components ($u$, $v$, $w$) are shifted by half of the grid spacing. |
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99 | \item<4->Spacings are equidistant, stretching along $z$ is possible. |
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100 | \end{itemize} |
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101 | |
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102 | \tikzstyle{plain} = [rectangle, draw, fill=white!20, text width=0.33\textwidth, font=\small] |
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103 | \begin{tikzpicture}[remember picture, overlay] |
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104 | \node at (current page.north west){% |
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105 | \begin{tikzpicture}[overlay] |
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106 | \node[plain, draw,anchor=west] at (88mm,-55mm) { |
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107 | \noindent \scriptsize general definition (cylic):\\ |
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108 | $\Psi$(0:nz+1,-1:ny+1,-1:nx+1)\\ |
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109 | $\Psi$(:,-1,:) $=\Psi$(:,ny,:)\\ |
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110 | $\Psi$(:,ny+1,:) $=\Psi$(:,0,:) |
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111 | |
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112 | }; |
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113 | \end{tikzpicture} |
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114 | }; |
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115 | \end{tikzpicture} |
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116 | \end{frame} |
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117 | |
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118 | % Folie 4 |
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119 | \begin{frame} |
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120 | \frametitle{Timestep Methods (I)} |
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121 | \footnotesize |
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122 | \begin{itemize} |
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123 | \item<1->\textbf{Euler}\\ |
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124 | \vspace{1mm} |
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125 | $\dfrac{\partial \psi(t)}{\partial t} = F (\psi(t)) \rightarrow |
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126 | \dfrac{\psi(t + \Delta t) - \psi(t)}{\Delta t} |
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127 | \approx F (\psi(t))$ \hspace{8mm} |
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128 | \onslide<2-> $u\dfrac{\Delta t}{\Delta x}=C<1$\\ |
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129 | \begin{flushright} |
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130 | for stability |
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131 | \end{flushright} |
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132 | |
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133 | \onslide<1->$\psi (t+\Delta t) = \psi(t) |
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134 | + \Delta t \cdot F(\psi(t)) \hspace{28mm} \mathcal{O}(\Delta t)$\\ |
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135 | (used for SGS-TKE in special cases) |
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136 | |
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137 | \vspace{3mm} |
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138 | \item<3-> \textbf{Leapfrog}\\ |
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139 | $\psi(t + \Delta t) = \psi(t - \Delta t)+2 \Delta t \cdot F(\psi(t))$ \hspace{16mm} $ |
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140 | \mathcal{O}(\Delta t^2)$ \hspace{3mm} $C \le 0.1$\\ |
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141 | Time-splitting requires a weak time filter (Asselin filter) |
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142 | |
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143 | \vspace{3mm} |
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144 | \item<4-> \textbf{Runge-Kutta, third-order}\\ |
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145 | $k_1=F(\psi(t))$\\ |
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146 | \vspace{1mm} |
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147 | $k_2=F \left( \psi(t) + \frac{1}{3} \Delta t \cdot k_1 \right)$\\ |
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148 | \vspace{1mm} |
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149 | $k_3=F \left( \psi(t) - \frac{3}{16} \Delta t \cdot k_1 |
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150 | + \frac{15}{16} \Delta t \cdot k_2 \right)$\\ |
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151 | \vspace{1mm} |
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152 | $\psi(t + \Delta t) = \psi(t) + \frac{1}{30}\Delta t (5 k_1 + 9 k_2 + 16 k_3)$ |
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153 | \hspace{12mm} $\mathcal{O}(\Delta t^2)$ \hspace{3mm} $C \le 0.9$\\ |
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154 | \end{itemize} |
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155 | \end{frame} |
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156 | |
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157 | % Folie 5 |
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158 | \begin{frame} |
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159 | \frametitle{Timestep Methods (II)} |
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160 | \footnotesize |
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161 | \onslide<1->In the PALM code, the different timestep schemes are treated by one |
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162 | equation using switches: |
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163 | $\psi (t + \Delta t ) = (1 - c_1) \cdot \psi (t - \Delta t ) + c_1 \cdot \psi (t) |
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164 | + \Delta t \cdot \left[ c_2 \cdot F (\psi (t) ) + c_3 \cdot F (\psi (t - |
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165 | \Delta t ) ) \right]$ |
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166 | \vspace{1mm} |
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167 | |
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168 | \onslide<2-> |
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169 | \begin{centering} |
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170 | \begin{table} |
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171 | \begin{tabular}{cccc} |
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172 | \bf{Scheme} & \bf{c$_1$} & \bf{c$_2$} & \bf{c$_3$}\\ |
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173 | Euler & 1 & 1 & 0\\ |
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174 | Leapfrog & 0 & 2 & 0\\ |
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175 | RK (1st step) & 1 & 1/3 & 0\\ |
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176 | RK (2nd step) & 1 & 15/16 & -25/48\\ |
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177 | RK (3rd step) & 1 & 8/15 & 1/15\\ |
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178 | \end{tabular} |
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179 | \end{table} |
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180 | \end{centering} |
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181 | |
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182 | \onslide<3-> |
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183 | \begin{align*} |
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184 | \psi (t - \Delta t) &= \psi (t) \hspace{15mm} \textbf{after each RK substep}\\ |
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185 | \psi (t) &= \psi (t + \Delta t) |
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186 | \end{align*} |
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187 | \end{frame} |
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188 | |
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189 | % Folie 6 |
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190 | \begin{frame} |
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191 | \frametitle{Advection Methods (I)} |
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192 | \small |
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193 | \begin{itemize} |
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194 | \item<1-> Piacsek Williams C3 (1970, J. Comput. Phy., 6, 392). |
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195 | \item<2-> Scheme of 2nd order accuracy. |
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196 | \item<3-> Conserves integrals of linear and quadratic quantities. |
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197 | \item<4-> Requires incompressibility $\rightarrow$ flux form of advection term. |
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198 | \onslide<4-> \includegraphics[width=0.8\textwidth]{numerics_bc_figures/advection_methods.png} |
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199 | \end{itemize} |
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200 | $$\left.\frac{\partial (u \psi)}{\partial x}\right\vert_i = \frac{1}{2 \Delta x} |
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201 | \left( u_{i+\frac{1}{2}} \psi_{i+1} - u_{i-\frac{1}{2}} \psi_{i-1} \right)$$ |
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202 | \begin{itemize} |
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203 | \item<5-> In case of momentum advection (e.g. $\psi=u$), $u_{i-1}$ and |
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204 | $u_{i+1}$ have to be obtained by linear interpolation. |
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205 | \item<5-> May cause $2 \Delta x$ wiggles in case of sharp gradients. |
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206 | \end{itemize} |
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207 | \end{frame} |
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208 | |
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209 | % Folie 7 |
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210 | \begin{frame} |
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211 | \frametitle{Advection Methods (II)} |
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212 | \begin{itemize} |
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213 | \item<1-> \small Upstream-spline\\ \scriptsize |
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214 | \onslide<1-> - Requires Euler timestep\\ |
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215 | \onslide<2-> - Nonlocal scheme: produces heavy load on communication network\\ |
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216 | \onslide<3-> - Numerically unstable under stable stratification |
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217 | \item<4-> \small Bott-Chlond\\ \scriptsize |
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218 | \onslide<4-> - Chlond (1994)\\ |
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219 | \onslide<5-> - Monotone, positive definit. Can only be used for scalars\\ |
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220 | \onslide<6-> - Conserves sharp gradients\\ |
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221 | \onslide<7-> - Numerically expensive\\ |
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222 | \onslide<8-> - Not optimized for use on cache-based machines. |
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223 | \item<9-> \small Default: Wicker and Skamarock scheme (5th order)\\ \scriptsize |
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224 | \onslide<9-> - Much better accuracy than Piacsek Williams\\ |
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225 | \onslide<10-> - Much simpler algorithm than Bott-Chlond\\ |
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226 | \onslide<11-> - Requires additional ghost layers\\ |
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227 | \onslide<12-> - Adds additional numerical dissipation |
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228 | |
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229 | \end{itemize} |
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230 | \end{frame} |
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231 | |
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232 | % Folie 8 |
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233 | \begin{frame} |
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234 | \frametitle{Advection Methods â Wicker/Skamarock (I)} |
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235 | \footnotesize |
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236 | \begin{itemize} |
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237 | \item Wicker and Skamarock (2002, Mon. Wea. Rev. 130, 2088 â 2097). |
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238 | \item Based on flux form of advection term |
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239 | \item Difference of fluxes at the edge of the grid cell is used to |
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240 | discretise advection term |
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241 | \end{itemize} |
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242 | |
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243 | \begin{columns}[T] |
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244 | \begin{column}{0.55\textwidth} |
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245 | \hspace{8mm}\includegraphics[width=0.8\textwidth]{numerics_bc_figures/numerical_grid_small.png} |
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246 | \end{column} |
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247 | \begin{column}{0.45\textwidth} |
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248 | $\frac{ \partial \psi}{\partial t} = - \nabla (u_i \psi) \approx |
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249 | - \frac{F_{i+\frac{1}{2}} - F_{i-\frac{1}{2}}}{\Delta x}$ |
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250 | \end{column} |
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251 | \end{columns} |
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252 | |
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253 | \tikzstyle{plain} = [rectangle, text width=0.1\textwidth, font=\small] |
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254 | \begin{tikzpicture}[remember picture, overlay] |
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255 | \node at (current page.north west){% |
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256 | |
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257 | \begin{tikzpicture}[overlay] |
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258 | \node[plain, anchor=west] at (2mm,-68mm) { |
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259 | \tikz |
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260 | { |
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261 | \draw[blue, -latex', line width=5pt] (1,0) -- (2,0); |
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262 | } |
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263 | |
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264 | $F_{i-\frac{1}{2}}$ |
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265 | }; |
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266 | \end{tikzpicture} |
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267 | |
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268 | \begin{tikzpicture}[overlay] |
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269 | \node[plain, anchor=west] at (62mm,-68mm) { |
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270 | \tikz |
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271 | { |
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272 | \draw[blue, -latex', line width=5pt] (,0) -- (2,0); |
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273 | } |
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274 | $F_{i+\frac{1}{2}}$ |
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275 | }; |
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276 | \end{tikzpicture} |
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277 | |
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278 | }; |
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279 | \end{tikzpicture} |
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280 | \end{frame} |
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281 | |
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282 | % Folie 9 |
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283 | \begin{frame} |
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284 | \frametitle{Advection Methods â Wicker/Skamarock (II)} |
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285 | |
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286 | |
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287 | |
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288 | \textbf{Finite difference approxiamtion of 6$^{\text{th}}$ order} |
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289 | \begin{tikzpicture}[scale=2] |
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290 | \tikzstyle{ann} = [draw=none,fill=none,right] |
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291 | \matrix[nodes={draw, thick, fill=blue!20}, row sep=0.3cm,column sep=0.5cm]{ |
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292 | \node[rectangle, rounded corners]{ |
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293 | $F^{\text{6th}}_{i-\frac{1}{2}} = \frac{1}{60} u_{i-\frac{1}{2}} \left( 37 |
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294 | (\Psi_i + \Psi_{i-1}) - 8 (\Psi_{i+1} + \Psi_{i-2}) + (\Psi_{i+2} |
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295 | + \Psi_{i-3}) \right)$ |
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296 | };\\ |
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297 | }; |
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298 | \end{tikzpicture} |
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299 | |
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300 | \vspace{5mm} |
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301 | |
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302 | \textbf{Artificially added numerical dissipation term} |
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303 | \begin{tikzpicture}[scale=2] |
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304 | \tikzstyle{ann} = [draw=none,fill=none,right] |
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305 | \matrix[nodes={draw, thick, fill=blue!40}, row sep=0.3cm,column sep=0.5cm]{ |
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306 | \node[rectangle, rounded corners]{ |
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307 | $\frac{-1}{60} \left| u_{i-\frac{1}{2}} \right| \left( 10 (\Psi_i - |
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308 | \Psi_{i-1}) - 5 (\Psi_{i+1} - \Psi_{i-2}) + (\Psi_{i+2} - \Psi_{i-3}) \right)$ |
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309 | };\\ |
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310 | }; |
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311 | \end{tikzpicture} |
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312 | \end{frame} |
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313 | |
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314 | % Folie 10 |
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315 | \begin{frame} |
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316 | \frametitle{Advection Methods â Wicker/Skamarock (III)} |
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317 | |
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318 | \begin{tikzpicture}[scale=2] |
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319 | \tikzstyle{ann} = [draw=none,fill=none,right] |
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320 | \matrix[nodes={draw, thick, fill=blue!20}, row sep=0.3cm,column sep=0.5cm]{ |
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321 | \node[rectangle, rounded corners]{ |
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322 | $F^{\text{6th}}_{i-\frac{1}{2}} = \frac{1}{60} u_{i-\frac{1}{2}} |
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323 | \left( 37 (\Psi_i + \Psi_{i-1}) - 8 (\Psi_{i+1} + \Psi_{i-2}) + (\Psi_{i+2} + |
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324 | \Psi_{i-3}) \right)$ |
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325 | };\\ |
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326 | }; |
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327 | \end{tikzpicture} |
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328 | |
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329 | \begin{columns}[T] |
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330 | \begin{column}{0.7\textwidth} |
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331 | \includegraphics[width=1\textwidth]{numerics_bc_figures/numerical_oscillations.png} |
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332 | \end{column} |
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333 | \begin{column}{0.3\textwidth} |
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334 | Centered Finite Differences produces numerical oscillations (''wiggles'') |
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335 | near sharp gradients. |
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336 | \end{column} |
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337 | \end{columns} |
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338 | \end{frame} |
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339 | |
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340 | % Folie 11 |
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341 | \begin{frame} |
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342 | \frametitle{Advection Methods â Wicker/Skamarock (IV)} |
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343 | \footnotesize |
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344 | |
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345 | \begin{columns}[T] |
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346 | \begin{column}{0.1\textwidth} |
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347 | \begin{tikzpicture}[scale=2] |
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348 | \tikzstyle{ann} = [draw=none,fill=none,right] |
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349 | \matrix[nodes={draw, thick, fill=blue!40}, row sep=0.3cm,column sep=0.5cm]{ |
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350 | \node[draw=none,fill=none]{ |
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351 | $F^{\text{5th}}_{i-\frac{1}{2}} = F^{\text{6th}}_{i-\frac{1}{2}}$ |
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352 | };\\ |
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353 | }; |
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354 | \end{tikzpicture} |
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355 | \end{column} |
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356 | \begin{column}{0.8\textwidth} |
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357 | \begin{tikzpicture}[scale=2] |
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358 | \tikzstyle{ann} = [draw=none,fill=none,right] |
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359 | \matrix[nodes={draw, thick, fill=blue!40}, row sep=0.3cm,column sep=0.5cm]{ |
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360 | \node[rectangle, rounded corners]{ |
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361 | $- \frac{1}{60} \left| u_{i-\frac{1}{2}} \right| \left( 10 (\Psi_i - \Psi_{i-1}) - |
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362 | 5 (\Psi_{i+1} - \Psi_{i-2}) + (\Psi_{i+2} - \Psi_{i-3}) \right)$ |
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363 | };\\ |
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364 | }; |
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365 | \end{tikzpicture} |
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366 | \end{column} |
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367 | \end{columns} |
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368 | |
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369 | \begin{columns}[T] |
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370 | \begin{column}{0.7\textwidth} |
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371 | \includegraphics[width=1\textwidth]{numerics_bc_figures/numerical_oscillations_2.png} |
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372 | \end{column} |
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373 | \begin{column}{0.3\textwidth} |
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374 | \vspace{3mm} |
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375 | \underline{Advantage}\\ |
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376 | Numerical Dissipation damps small scale oscillations.\\ |
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377 | \vspace{3mm} |
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378 | \underline{Disadvantage}\\ |
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379 | In a turbulent flow numerical dissipation removes energy from small scales. |
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380 | |
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381 | \end{column} |
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382 | \end{columns} |
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383 | \end{frame} |
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384 | |
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385 | % Folie 12 |
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386 | \begin{frame} |
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387 | \frametitle{Advection Methods â Wicker/Skamarock (V)} |
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388 | |
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389 | \begin{columns}[T] |
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390 | \begin{column}{0.6\textwidth} |
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391 | \includegraphics[width=1\textwidth]{numerics_bc_figures/numerical_properties.png} |
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392 | \end{column} |
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393 | \begin{column}{0.4\textwidth} |
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394 | \includegraphics[width=1\textwidth]{numerics_bc_figures/pw_ws.png} |
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395 | \end{column} |
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396 | \end{columns} |
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397 | |
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398 | \begin{itemize} |
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399 | \item Better resolution of larger scales $(> 8\,\Delta x)$ and hence less |
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400 | numerical energy transfer from larger to smaller scales compared to lower |
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401 | order schemes. |
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402 | \item Less spectral energy at smaller scales. |
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403 | \end{itemize} |
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404 | |
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405 | \end{frame} |
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406 | |
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407 | % Folie 13 |
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408 | \begin{frame} |
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409 | \frametitle{Pressure Solver (I)} |
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410 | \footnotesize |
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411 | \begin{itemize} |
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412 | \item<1-> Governing equations of PALM require incompressibility |
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413 | \item<2-> Incompressibility is reached by a predictor-corrector method\\ |
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414 | \scriptsize |
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415 | 1. Momentum equations are solved without the pressure term giving a |
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416 | provisional velocity field which is not free of divergence.\\ |
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417 | $\overline{u}^{t+\Delta t}_{i_{\mathrm{prov}}} = \overline{u}^t_i + |
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418 | \Delta t \left( - \frac{\partial}{\partial x_k} \overline{u}^t_k |
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419 | \overline{u}^t_i - (\varepsilon_{ijk} f_j \overline{u}^t_k |
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420 | - \varepsilon_{i3k} f_3 u_{\mathrm{g}_k}) |
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421 | + g \frac{\overline{\theta^*}^t}{\theta_0} \delta_{i3} |
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422 | - \frac{\partial}{\partial x_k} \overline{u'_k u'_i}^t \right)$\\ |
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423 | \vspace{3mm} |
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424 | \onslide<3-> 2. Assign all remaining divergences to the (perturbation) |
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425 | pressure $p^*$ so that the new corrected velocity field is the sum of the |
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426 | provisional, divergent field and the perturbation pressure term.\\ |
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427 | $\overline{u}^{t+\Delta t}_{i} = |
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428 | \overline{u}^{t+\Delta t}_{i_{\mathrm{prov}}} - |
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429 | \frac{\Delta t}{\rho_0} \frac{\partial \overline{p^*}^t}{\partial x_i}$\\ |
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430 | \vspace{3mm} |
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431 | \onslide<4-> 3. The divergence operator is applied to this equation. |
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432 | Demanding a corrected velocity field free of divergence, this leads to a |
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433 | Poisson equation for the perturbation pressure.\\ |
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434 | $\frac{\partial^2 \overline{p^*}^t}{\partial x_i^2} = \frac{\rho_0} |
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435 | {\Delta t} \frac{\partial \overline{u}_{i_{\mathrm{prov}}}^{t + \Delta t}} |
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436 | {\partial x_i}$\\ |
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437 | \vspace{3mm} |
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438 | \onslide<5-> 4. After solving the Poisson equation, the final velocity field |
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439 | is \\ |
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440 | calculated as given in step 2.\\ |
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441 | |
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442 | \end{itemize} |
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443 | \end{frame} |
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444 | |
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445 | % Folie 14 |
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446 | \begin{frame} |
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447 | \frametitle{Pressure Solver (II)} |
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448 | \small |
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449 | |
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450 | \begin{itemize} |
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451 | \item FFT-solver\\ |
---|
452 | \onslide<1-> 1. Discretization of the Poisson-equation by central differences\\ |
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453 | \onslide<2-> 2. 2D discrete FFT in both horizontal directions\\ |
---|
454 | \onslide<3-> 3. Solving the resulting tridiagonal set of linear equations\\ |
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455 | \onslide<4-> 4. Inverse 2D discrete FFT in both horizontal directions leading |
---|
456 | to the perturbation pressure |
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457 | |
---|
458 | \begin{itemize} |
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459 | \item<5-> Very fast and accurate, $\mathcal{O}(n \log n)$, $n$: |
---|
460 | number of gridpoints |
---|
461 | \item<6-> CPU requirement $<$ 50\% of total CPU time |
---|
462 | \item<7-> Due to non-locality of the FFT, transpositions are required |
---|
463 | on parallel computers |
---|
464 | \item<8-> Usage requires periodic boundary conditions and uniform grids |
---|
465 | along $x$ and $y$ |
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466 | \end{itemize} |
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467 | \end{itemize} |
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468 | \end{frame} |
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469 | |
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470 | % Folie 15 |
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471 | \begin{frame} |
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472 | \frametitle{Pressure Solver (III)} |
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473 | \scriptsize |
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474 | \begin{columns} |
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475 | \begin{column}{1.03\textwidth} |
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476 | \begin{itemize} |
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477 | \item<1-> Multigrid-method\\ |
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478 | \begin{itemize}\scriptsize |
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479 | \item Iterative solver\\ |
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480 | \scriptsize |
---|
481 | basic idea: Poisson equation is transformed to a fixed point problem:\\ |
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482 | $\vec{p}^{k+1} = T \cdot \vec{p}^k + \vec{c}^k$\\ |
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483 | \vspace{1mm} |
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484 | \onslide<2-> starting from a first guess, the solution will be |
---|
485 | improved by repeated execution of the fixed point problem:\\ |
---|
486 | $\begin{array}{rcl} |
---|
487 | \vec{p}^{1} &=&T \cdot \vec{p}^0 + \vec{c}^0\\ |
---|
488 | \vec{p}^{2} &=&T \cdot \vec{p}^1 + \vec{c}^1 |
---|
489 | \vspace{-2mm}\\ |
---|
490 | |
---|
491 | &\vdots& |
---|
492 | \vspace{-1.5mm}\\ |
---|
493 | |
---|
494 | \vec{p}^{k} &=&T \cdot \vec{p}^{k-1} + \vec{c}^{k-1}\\ |
---|
495 | \vec{p}^{k+1} &=&T \cdot \vec{p}^k + \vec{c}^k\\ |
---|
496 | \end{array}$\\ |
---|
497 | \vspace{1mm} |
---|
498 | \onslide<3-> Depending on the structure of the matrix $T$ and vector |
---|
499 | $c$ different iterative solvers can be defined, e.g.: Jacobi-scheme |
---|
500 | (here on 2D-uniform grid):\\ |
---|
501 | $p^{k+1}_{i,j} = \frac{1}{4} \cdot \left( p^k_{i-1,j} + p^k_{i+1,j} |
---|
502 | + p^k_{i,j-1} + p^k_{i,j+1} - \Delta x^2 f(i,j,k) \right)$\\ |
---|
503 | \scriptsize \vspace{2mm} |
---|
504 | \item<4-> With each iteration step $k$ the improved solution converges towards |
---|
505 | the exact solution. |
---|
506 | \item<5-> Iterative schemes are 'local schemes' $\rightarrow$ information |
---|
507 | is needed \\ only from neighboring grid-points. |
---|
508 | \item<6-> Very low convergence: $\mathcal{O}(n^2)$. |
---|
509 | \end{itemize} |
---|
510 | \end{itemize} |
---|
511 | \end{column} |
---|
512 | \end{columns} |
---|
513 | \end{frame} |
---|
514 | |
---|
515 | % Folie 16 |
---|
516 | \begin{frame} |
---|
517 | \frametitle{Pressure Solver (IV)} |
---|
518 | \begin{itemize} |
---|
519 | \item<1-> Multigrid-method\\ |
---|
520 | \begin{itemize} |
---|
521 | \item Due to their locality, iterative solvers show a frequency-dependent |
---|
522 | reduction of the residual: low frequencies are reduced slower than high |
---|
523 | frequencies. |
---|
524 | \item<2-> The main idea of the multigrid method is to reduce errors of different |
---|
525 | frequencies on grids with different grid spacing: |
---|
526 | \begin{itemize} |
---|
527 | \item errors of high frequency are reduced on fine grids |
---|
528 | \item errors of low frequency are reduced on coarse grids. |
---|
529 | \end{itemize} |
---|
530 | \end{itemize} |
---|
531 | \end{itemize} |
---|
532 | \onslide<2-> |
---|
533 | \begin{figure}[htp] |
---|
534 | \centering |
---|
535 | \includegraphics[scale=0.35]{numerics_bc_figures/errors.png} |
---|
536 | \end{figure} |
---|
537 | \end{frame} |
---|
538 | |
---|
539 | % Folie 17 |
---|
540 | \begin{frame} |
---|
541 | \frametitle{Pressure Solver (V)} |
---|
542 | |
---|
543 | \begin{columns}[T] |
---|
544 | \begin{column}{0.65\textwidth} |
---|
545 | \begin{itemize} |
---|
546 | \item<1-> Multigrid-method\\ |
---|
547 | \begin{itemize} |
---|
548 | \footnotesize |
---|
549 | \item On each grid-level an approximate solution of the fixed point |
---|
550 | equation is obtained performing a few iterations. |
---|
551 | \item<2-> The solution is transmitted to the next coarser grid-level |
---|
552 | where it is used as the first guess to solve the fixed point problem. |
---|
553 | \item<3-> This procedure is performed up to the coarsest grid-level |
---|
554 | containing two grid-points in each direction. |
---|
555 | \item<4-> From the coarsest grid-level the procedure is passed in |
---|
556 | backward order to get the final solution. |
---|
557 | \item<5-> For large grids faster than FFT method. |
---|
558 | \item<6-> V- and W-cycles are implemented. |
---|
559 | \end{itemize} |
---|
560 | \end{itemize} |
---|
561 | \end{column} |
---|
562 | \begin{column}{0.5\textwidth} |
---|
563 | \onslide<2-> |
---|
564 | \includegraphics[width=1\textwidth]{numerics_bc_figures/multigrid.png} |
---|
565 | \end{column} |
---|
566 | \end{columns} |
---|
567 | \end{frame} |
---|
568 | |
---|
569 | |
---|
570 | |
---|
571 | \section{Boundary Conditions} |
---|
572 | \subsection{Boundary Conditions} |
---|
573 | |
---|
574 | % Folie 18 |
---|
575 | \begin{frame} |
---|
576 | \frametitle{Boundary Conditions (I)} |
---|
577 | |
---|
578 | \begin{itemize} |
---|
579 | \item<1-> Lateral $(xy)$ boundary conditions:\\ |
---|
580 | \begin{itemize} |
---|
581 | \item Cyclic by default, allowing undisturbed evolution / advection of turbulence. |
---|
582 | \begin{columns}[T] |
---|
583 | \begin{column}{0.2\textwidth} |
---|
584 | %leer |
---|
585 | \end{column} |
---|
586 | \begin{column}{0.5\textwidth} |
---|
587 | \includegraphics[width=1\textwidth]{numerics_bc_figures/lateral_bc.png}\\ |
---|
588 | \vspace{2mm} |
---|
589 | \end{column} |
---|
590 | \begin{column}{0.4\textwidth} |
---|
591 | $\begin{array}{rcl} |
---|
592 | \Psi(-1) &=& \Psi(n)\\ |
---|
593 | \Psi(n+1) &=& \Psi(0)\\ |
---|
594 | \end{array}$ |
---|
595 | \end{column} |
---|
596 | \end{columns} |
---|
597 | |
---|
598 | \item<2-> Dirichlet (inflow) and radiation (outflow) conditions are allowed along |
---|
599 | either $x$- or $y$-direction. |
---|
600 | |
---|
601 | \item<3-> In case of a Dirichlet condition, the inflow is laminar (by default) and |
---|
602 | the domain has to be extended to allow for the development of a turbulent |
---|
603 | state, if neccessary. |
---|
604 | \item<4-> Non-cyclic lateral conditions require the use of the multigrid-method |
---|
605 | for solving the Poisson-equation. |
---|
606 | |
---|
607 | \end{itemize} |
---|
608 | \end{itemize} |
---|
609 | \end{frame} |
---|
610 | |
---|
611 | % Folie 19 |
---|
612 | \begin{frame} |
---|
613 | \frametitle{Boundary Conditions (II)} |
---|
614 | |
---|
615 | \begin{columns}[T] |
---|
616 | \begin{column}{0.7\textwidth} |
---|
617 | \scriptsize |
---|
618 | \begin{itemize} |
---|
619 | \item<1-> Surface boundary condition: |
---|
620 | \begin{itemize} |
---|
621 | \scriptsize |
---|
622 | \item<1-> Monin-Obukhov-similarity is used by default, i.e. a Prandtl-layer is |
---|
623 | assumed between the surface and the first grid layer.\\ |
---|
624 | $\frac{\partial \overline{u}}{\partial z} = \frac{u_{*}}{\kappa z} |
---|
625 | \Phi_{\mathrm{m}}$; \hspace{3mm} $u_{*} = \sqrt{- \overline{w' u'_0}} |
---|
626 | = \sqrt{\frac{\tau_0}{\overline{\rho}}}$\\ |
---|
627 | $\frac{\partial \overline{\theta}}{\partial z} = \frac{\vartheta_{*}} |
---|
628 | {\kappa z} \Phi_{\mathrm{h}}$; \hspace{3mm} $\vartheta_{*} = |
---|
629 | \frac{\overline{w' \theta'_0}}{u_{*}}$\\ |
---|
630 | \vspace{2mm} |
---|
631 | \item<2-> Integration between $z=z_0$ (roughness height) and $z=z_{\mathrm{p}}$ |
---|
632 | (top of Prandtl-layer, $k=1$) gives the only unknowns $u_{*}$ and |
---|
633 | $\theta_{*}$ which then define the surface momentum and heat flux, |
---|
634 | used as the real boundary conditions.\\ |
---|
635 | \vspace{2mm} |
---|
636 | \item<3-> $\Phi_{\mathrm{m}}$, $\Phi_{\mathrm{h}}$: Dyer-Businger functions\\ |
---|
637 | \onslide<4->$\Phi_{\mathrm{m}} = \left\{ \begin{array}{cc} |
---|
638 | 1+5\,\mathrm{Rif} & \text{stable}\\ |
---|
639 | 1 & \text{neutral}\\ |
---|
640 | (1-16\,\mathrm{Rif})^{-1/4} & \text{unstable}\\ |
---|
641 | \end{array} \right. $ |
---|
642 | |
---|
643 | \end{itemize} |
---|
644 | \end{itemize} |
---|
645 | \end{column} |
---|
646 | \begin{column}{0.3\textwidth} |
---|
647 | \onslide<1-> |
---|
648 | \includegraphics[width=1\textwidth]{numerics_bc_figures/surface_bc.png}\\ |
---|
649 | \vspace{-2mm} |
---|
650 | Prandtl-layer\\ |
---|
651 | \vspace{8mm} |
---|
652 | \onslide<5-> |
---|
653 | $\mathrm{Rif} = \frac{\frac{g}{\tilde{\theta}} |
---|
654 | \overline{w' \theta'_0}}{\overline{w' u'} |
---|
655 | \frac{\partial \overline{u}}{\partial z}}$\\ |
---|
656 | \scriptsize Richardson flux number |
---|
657 | \end{column} |
---|
658 | \end{columns} |
---|
659 | \end{frame} |
---|
660 | |
---|
661 | % Folie 20 |
---|
662 | \begin{frame} |
---|
663 | \frametitle{Boundary Conditions (III)} |
---|
664 | |
---|
665 | \begin{itemize} |
---|
666 | \item<1-> Surface boundary condition: |
---|
667 | \begin{itemize} |
---|
668 | \footnotesize |
---|
669 | \item<1-> Monin-Obukhov-similarity is only valid for a |
---|
670 | horizontal surface with homogeneous conditions. |
---|
671 | \item<2-> The surface temperature has to be prescribed. |
---|
672 | Alternatively, the surface heat flux can be prescribed. |
---|
673 | \item<3-> Instead of MO-similarity, no-slip conditions or |
---|
674 | free-slip conditions can be used |
---|
675 | \begin{equation*} |
---|
676 | u(z=0) = 0, \quad v(z=0)=0 \hspace{15mm} |
---|
677 | \frac{\partial u}{\partial z} = 0, \quad |
---|
678 | \frac{\partial v}{\partial z} = 0 \qquad |
---|
679 | \end{equation*} |
---|
680 | realized by |
---|
681 | \begin{flalign*} |
---|
682 | u(k=0)=-u(k=1) \hspace{18mm} u(k=0)=u(k=1)\\ |
---|
683 | v(k=0)=-v(k=1) \hspace{18mm} v(k=0)=v(k=1) |
---|
684 | \end{flalign*} |
---|
685 | \item<4-> Pressure boundary condition: |
---|
686 | $\dfrac{\partial p}{\partial z} = 0$ |
---|
687 | in order to guarantee $w(z=0)=0$ |
---|
688 | \item<5-> SGS-TKE condition $\dfrac{\partial e}{\partial z}=0$ |
---|
689 | \end{itemize} |
---|
690 | \end{itemize} |
---|
691 | \end{frame} |
---|
692 | |
---|
693 | % Folie 21 |
---|
694 | \begin{frame} |
---|
695 | \frametitle{Boundary Conditions (IV)} |
---|
696 | |
---|
697 | \begin{itemize} |
---|
698 | \item<1-> Boundary conditions at the top (default) |
---|
699 | \begin{itemize} |
---|
700 | \item<1-> Dirichlet conditions for velocities: $u=u_{\mathrm{g}}, |
---|
701 | \quad v=v_{\mathrm{g}}, \quad w=0$ |
---|
702 | \item<2-> Neumann conditions (temporal constant gradients) for scalars: |
---|
703 | $$\frac{\partial \theta}{\partial z} = |
---|
704 | \left. \frac{\partial \theta}{\partial z} \right\vert_{t=0}$$ |
---|
705 | \item<3-> Pressure: Dirichlet $p=0$ |
---|
706 | or Neumann $\dfrac{\partial p}{\partial z} = 0$ |
---|
707 | \item<4-> SGS-TKE: Neumann $\dfrac{\partial e}{\partial z} = 0$ |
---|
708 | \item<5-> A damping layer can be switched on in order to absorb |
---|
709 | gravity waves. |
---|
710 | \end{itemize} |
---|
711 | \end{itemize} |
---|
712 | \end{frame} |
---|
713 | |
---|
714 | % Folie 22 |
---|
715 | \begin{frame} |
---|
716 | \frametitle{Initial Conditions} |
---|
717 | |
---|
718 | All 3D-arrays are initialized with vertical profiles (horizontally homogeneous).\\ |
---|
719 | \quad \\ |
---|
720 | Two different profiles can be chosen: |
---|
721 | \begin{itemize} |
---|
722 | \item<2-> \textbf{constant (piecewise linear) profiles} |
---|
723 | \begin{itemize} |
---|
724 | \footnotesize |
---|
725 | \item \textbf{e.g.} $u=0, v=0, \dfrac{\partial \theta}{\partial z}=0$ |
---|
726 | \textbf{up to} $z=\unit[1000]{m}$, |
---|
727 | $\dfrac{\partial \theta}{\partial z}=+1.0$ \textbf{up to top} |
---|
728 | \end{itemize} |
---|
729 | \item<3-> \textbf{velocity profiles calculated by a 1D-model (which is a part of PALM)} |
---|
730 | \begin{itemize} |
---|
731 | \footnotesize |
---|
732 | \item \textbf{constant (piecewise linear) temperature profile is used |
---|
733 | for the 1D-model} |
---|
734 | \end{itemize} |
---|
735 | \end{itemize} |
---|
736 | \onslide<4-> |
---|
737 | \underline{Under horizontally homogeneous initial conditions, random}\\ |
---|
738 | \underline{fluctuations have to be added in order to generate turbulence!} |
---|
739 | \end{frame} |
---|
740 | |
---|
741 | \end{document} |
---|