[1105] | 1 | % $Id: cloud_physics.tex 1515 2015-01-02 11:35:51Z knoop $ |
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| 2 | \input{header_tmp.tex} |
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| 3 | |
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| 4 | \usepackage[utf8]{inputenc} |
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| 5 | \usepackage{ngerman} |
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| 6 | \usepackage{pgf} |
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| 7 | \usetheme{Dresden} |
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| 8 | \usepackage{subfigure} |
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| 9 | \usepackage{units} |
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| 10 | \usepackage{multimedia} |
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| 11 | \usepackage{hyperref} |
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| 12 | \newcommand{\event}[1]{\newcommand{\eventname}{#1}} |
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| 13 | \usepackage{xmpmulti} |
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| 16 | \def\Tiny{\fontsize{4pt}{4pt}\selectfont} |
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| 17 | |
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| 18 | %---------- neue Pakete |
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| 19 | \usepackage{amsmath} |
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| 20 | \usepackage{amssymb} |
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| 21 | \usepackage{multicol} |
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| 22 | \usepackage{pdfcomment} |
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| 23 | \usepackage{xcolor} |
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| 24 | \usepackage{siunitx} |
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| 30 | } |
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[1515] | 32 | \institute{Institute of Meteorology and Climatology, Leibniz UniversitÀt Hannover} |
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| 33 | \selectlanguage{english} |
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[1105] | 34 | \date{last update: \today} |
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| 35 | \event{PALM Seminar} |
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| 36 | \setbeamertemplate{navigation symbols}{} |
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| 37 | \setbeamersize{text margin left=.5cm,text margin right=.2cm} |
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| 38 | \setbeamertemplate{footline} |
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| 39 | {% |
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| 40 | \begin{beamercolorbox}[rightskip=-0.1cm]& |
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| 41 | {\includegraphics[height=0.65cm]{imuk_logo.pdf}\hfill \includegraphics[height=0.65cm]{luh_logo.pdf}} |
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| 42 | \end{beamercolorbox} |
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| 43 | \begin{beamercolorbox}[ht=2.5ex,dp=1.125ex,% |
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| 44 | leftskip=.3cm,rightskip=0.3cm plus1fil]{title in head/foot}% |
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| 45 | {\leavevmode{\usebeamerfont{author in head/foot}\insertshortauthor} \hfill \eventname \hfill \insertframenumber \; / \inserttotalframenumber}% |
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| 47 | % \begin{beamercolorbox}[colsep=1.5pt]{lower separation line foot}% |
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| 48 | % \end{beamercolorbox} |
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| 49 | }%\logo{\includegraphics[width=0.3\textwidth]{luhimuk_logo.eps}} |
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| 50 | |
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| 51 | \title[PALM - Cloud Physics]{PALM - Cloud Physics} |
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[1515] | 52 | \author{PALM group} |
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[1105] | 53 | |
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| 54 | % Notes: |
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| 55 | % jede subsection bekommt einen punkt im menu (vertikal ausgerichtet. |
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| 56 | % jeder frame in einer subsection bekommt einen punkt (horizontal ausgerichtet) |
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| 57 | \begin{document} |
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| 58 | |
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| 59 | % Folie 1 |
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| 60 | \begin{frame} |
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| 61 | \titlepage |
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| 62 | \end{frame} |
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| 63 | |
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| 64 | % Folie 2 |
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| 65 | \begin{frame} |
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| 66 | \frametitle{Contents} |
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| 67 | |
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| 68 | \begin{itemize} |
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| 69 | \item<1->{Motivation} |
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| 70 | \item<1->{Approach} |
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| 71 | \item<1->{Extension if basic equations and SGS-model} |
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| 72 | \item<1->{Additional Sources / Sinks in prognostic equations} |
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| 73 | \item<1->{Control parameters} |
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| 74 | \item<1->{Example of shallow cumulus clouds} |
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| 75 | \end{itemize} |
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| 76 | \end{frame} |
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| 77 | |
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| 78 | % Folie 3 |
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| 79 | \begin{frame} |
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| 80 | \frametitle{Why simulating clouds?} |
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| 81 | |
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| 82 | \begin{itemize} |
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| 83 | \item<2->{Atmospheric boundary layers are usually covered with shallow clouds like cumulus or stratocumulus which are the inherent characteristic of more realistic boundary layers.}\\ \par\medskip |
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| 84 | \item<3->{Optional feature to account for:}\\ \par\medskip |
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| 85 | \begin{itemize} |
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| 86 | \item<4->{Microphysical processes} |
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| 87 | \begin{itemize} |
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| 88 | \item<4->{Evaporation / condensation of cloud droplets} |
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| 89 | \item<4->{Precipitation} |
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| 90 | \item<4->{Transport of humidity and liquid water}\\ \par\medskip |
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| 91 | \end{itemize} |
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| 92 | \item<5->{Radiation processes} |
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| 93 | \begin{itemize} |
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| 94 | \item<5->{Short-wave radiation} |
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| 95 | \item<5->{Long-wave radiation} |
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| 96 | \end{itemize} |
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| 97 | \end{itemize} |
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| 98 | \end{itemize} |
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| 99 | \end{frame} |
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| 100 | |
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| 101 | % Folie 4 |
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| 102 | \begin{frame} |
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| 103 | \frametitle{Approach} |
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| 104 | |
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| 105 | \begin{itemize} |
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| 106 | \item<1->{One-moment bulk model $\Rightarrow$ in contrast to PALM's Lagrangian cloud model (LCM) (see also particle\_model\_cloud\_physics.pdf, Riechelmann et al., 2012)} |
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| 107 | \item<2->{Dynamics like advection and diffusion are covered by Navier-Stokes equations (see basic\_equations.pdf)} |
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| 108 | \item<3->{Thermodynamics are considered by parameterizations $\Rightarrow$ non explicit treatment of microphysical processes} |
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| 109 | \item<4->{Total water specific humidity $q$ is prognosed as an additional variable $\Rightarrow$ one-moment} |
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| 110 | \item<5->{Liquid water specific humidity $q_l$ is determined diagnostically} |
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| 111 | \end{itemize} |
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| 112 | \uncover<6->{PALM's basic equations are extended to account for cloud microphysics} |
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| 113 | \end{frame} |
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| 114 | |
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| 115 | % Folie 5 |
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| 116 | \begin{frame} |
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| 117 | \frametitle{Definitions (I)} |
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| 118 | |
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| 119 | \begin{itemize} |
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| 120 | \item<1->{Liquid water potential temperature $\theta_{l}$ (defined by Betts, 1973)\\ |
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| 121 | \begin{minipage}[c][1.5cm][c]{0.38\textwidth} |
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| 122 | \qquad$\theta_{l}=\theta -\frac{L_{v}}{c_{p}}\left( \frac{\theta}{T} \right) q_{l}$ |
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| 123 | \end{minipage} |
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| 124 | \begin{minipage}[c][1.5cm][c]{0.52\textwidth} |
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| 125 | {\scriptsize $L_{v}$: latent heat of vaporization; $L_{v}=\SI{2,5e6}{J/kg}$\\ |
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| 126 | $c_{p}$: specific heat of dry air; $c_{p}=\SI{1005}{J/kg K}$} |
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| 127 | \end{minipage}\\ |
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| 128 | is the potential temperature of an air parcel if all its liquid water evaporates due to an reversible moist adiabatic descent.} |
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| 129 | \item<2->{Total water specific humidity $q$\\ |
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| 130 | \begin{minipage}[c][1.5cm][c]{0.38\textwidth} |
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| 131 | \qquad$q = q_{v} + q_{l}$ |
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| 132 | \end{minipage} |
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| 133 | \begin{minipage}[c][1.5cm][c]{0.52\textwidth} |
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| 134 | {\scriptsize $q_{v}$: specific humidity\\ |
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| 135 | $q_{l}$: liquid water speciffic humidity} |
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| 136 | \end{minipage}\\ |
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| 137 | } |
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| 138 | \item<3->{$\theta_{l}$ and $q$ are the prognostic variables when using PALM's cloud physics model} |
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| 139 | \end{itemize} |
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| 140 | \end{frame} |
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| 141 | |
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| 142 | % Folie 6 |
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| 143 | \begin{frame} |
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| 144 | \frametitle{Definitions (II)} |
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| 145 | |
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| 146 | |
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| 147 | \begin{itemize} |
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| 148 | \item<1->{Why using $\theta_{l}$ and $q$?}\\ \par\medskip |
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| 149 | \begin{itemize} |
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| 150 | \item<2->{$\theta_{l}$ and $q$ are conservative quantities in the absence of precipitation, radiation and freezing processes.} |
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| 151 | \item<3->{Phase transitions do not have to be described explicitly in the prognostic equations.} |
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| 152 | \item<4->{In case of dry convection (no condensation): $\theta_{l} \rightarrow \theta$ and $q \rightarrow q_{v}$} |
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| 153 | \item<5->{Parameterizations of SGS-fluxes can be retained.} |
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| 154 | \item<6->{...$\rightarrow$ see also Deardorff, 1976}\\ \par\medskip |
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| 155 | \end{itemize} |
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| 156 | \item<7->{Virtual potential temperature $\theta_{l}$\\ |
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| 157 | \begin{minipage}[c][1.5cm][c]{0.65\textwidth} |
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| 158 | \qquad$\theta_{v}=\left[\theta_{l} +\frac{L_{v}}{c_{p}}\left( \frac{\theta}{T} \right) q_{l}\right] \left(1+0,61 q - 1,61q_{l}\right)$ |
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| 159 | \end{minipage} |
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| 160 | \begin{minipage}[c][1.5cm][c]{0.22\textwidth} |
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| 161 | \end{minipage}\\ |
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| 162 | } |
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| 163 | \end{itemize} |
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| 164 | \end{frame} |
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| 165 | |
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| 166 | % Folie 7 |
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| 167 | \begin{frame} |
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| 168 | \frametitle{Extension of basic equations (I)} |
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| 169 | |
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| 170 | \begin{itemize} |
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| 171 | \item<1->{First principle is solved for $\theta_{l}$ (instead of $\theta$)\\ |
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| 172 | \begin{minipage}[c][1.5cm][c]{0.46\textwidth} |
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| 173 | \qquad$\frac{\partial\bar{\theta}_{l}}{\partial t}= - \frac{\partial\bar{u_{k}} \bar{\theta_{l}}}{\partial x_{k}}- \frac{\partial H_{k}}{\partial x_{k}} + Q_{\theta}$ |
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| 174 | \end{minipage} |
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| 175 | \begin{minipage}[c][1.5cm][c]{0.46\textwidth} |
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| 176 | {\scriptsize SGS flux: $H_{k}=\overline{u_{k} \theta_{l}} - \bar{u}_{k}\bar{\theta}_{l}$} |
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| 177 | \end{minipage}\\ \par\medskip |
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| 178 | } |
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| 179 | \item<2->{Conservation equation for total water specific humidity $q$ (instead of $q_{v}$)\\ |
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| 180 | \begin{minipage}[c][1.5cm][c]{0.46\textwidth} |
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| 181 | \qquad$\frac{\partial\bar{q}}{\partial t}= - \frac{\partial\bar{u_{k}} \bar{q}}{\partial x_{k}}- \frac{\partial W_{k}}{\partial x_{k}} + Q_{\theta}$ |
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| 182 | \end{minipage} |
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| 183 | \begin{minipage}[c][1.5cm][c]{0.46\textwidth} |
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| 184 | {\scriptsize SGS flux: $W_{k}=\overline{u_{k} q} - \bar{u}_{k}\bar{q}$} |
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| 185 | \end{minipage}\\ |
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| 186 | } |
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| 187 | \end{itemize} |
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| 188 | \end{frame} |
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| 189 | |
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| 190 | % Folie 8 |
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| 191 | \begin{frame} |
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| 192 | \frametitle{Extension of basic equations (II)} |
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| 193 | |
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| 194 | \begin{itemize} |
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| 195 | \item<1->{Sources / Sinks due to radiation (RAD) and precipitation (PREC) |
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| 196 | \begin{minipage}[c][3.0cm][c]{0.46\textwidth} |
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| 197 | \begin{align*} |
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| 198 | Q_{\theta} &= \left(\frac{\partial\bar{\theta}_{l}}{\partial t}\right)_{\text{RAD}} + \left(\frac{\partial\bar{\theta}_{l}}{\partial t}\right)_{\text{PREC}}\\ |
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| 199 | Q_{W} &= \left(\frac{\partial\bar{q}}{\partial t}\right)_{\text{PREC}} |
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| 200 | \end{align*} |
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| 201 | \end{minipage}\\ \par\medskip |
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| 202 | } |
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| 203 | \item<2->{Diagnostic approach for $\bar{q}_{l}$ (all-or-nothing schema) |
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| 204 | \begin{minipage}[c][1.5cm][c]{0.44\textwidth} |
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| 205 | \begin{align*} |
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| 206 | \bar{q}_{l} = |
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| 207 | \begin{cases} |
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| 208 | \bar{q}-\bar{q}_{s} & \text{if } \bar{q} > \bar{q}_{s} \\ |
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| 209 | 0 & \text{if } otherwise |
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| 210 | \end{cases} |
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| 211 | \end{align*} |
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| 212 | \end{minipage}\\ \par\medskip |
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| 213 | $\bar{q}_{s}$ is the saturation value of the specific humidity which is determined based on Sommeria and Deardorff, 1977 and further described in cloud\_physics.pdf |
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| 214 | } |
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| 215 | \end{itemize} |
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| 216 | \end{frame} |
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| 217 | |
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| 218 | % Folie 9 |
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| 219 | \begin{frame} |
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| 220 | \frametitle{Extension of SGS model (I)} |
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| 221 | |
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| 222 | \begin{itemize} |
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| 223 | \item<1->{SGS fluxes are modelled by means of a down-gradient approximation |
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| 224 | \begin{minipage}[c][1.5cm][c]{0.6\textwidth} |
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| 225 | \begin{equation*} |
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| 226 | H_{k} = - K_{h} \frac{\partial\bar{\theta}_{l}}{\partial x_{k}} \qquad \text{;} \qquad W_{k} = - K_{h} \frac{\partial\bar{q}}{\partial x_{k}} |
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| 227 | \end{equation*} |
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| 228 | \end{minipage}\\ \par\medskip |
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| 229 | } |
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| 230 | \item<2->{SGS flux of potential temperature $\overline{u_{3}' \theta'}$ in prognostic equation of the SGS-TKE $\bar{e}$ is replaced by the flux of the virtual potential temperature $\overline{u_{3}' \theta_{v}'}$ which is modelled according to Deardorff, 1980 as: |
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| 231 | \begin{minipage}[c][1.2cm][c]{0.44\textwidth} |
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| 232 | \begin{equation*} |
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| 233 | \overline{u_{3}' \theta_{v}'} = K_{1} \cdot H_{3} + K_{2} \cdot W_{3} |
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| 234 | \end{equation*} |
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| 235 | \end{minipage}\\ \par\medskip |
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| 236 | } |
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| 237 | \end{itemize} |
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| 238 | \end{frame} |
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| 239 | |
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| 240 | % Folie 10 |
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| 241 | \begin{frame} |
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| 242 | \frametitle{Extension of SGS model (II)} |
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| 243 | |
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| 244 | \begin{itemize} |
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| 245 | \item<1->{The coefficients $K_{1}$ and $K_{2}$ depend on the saturation state of the grid volume (see also Cuijpers u. Duynkerke, 1993)\\ \par\medskip |
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| 246 | \begin{itemize} |
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| 247 | \item<2->{Unsaturated grid box ($\bar{q}_{l} = 0$)\\ |
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| 248 | \begin{minipage}[c][1.5cm][c]{0.35\textwidth} |
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| 249 | \begin{align*} |
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| 250 | K_{1} &= 1,0 + 0,61\cdot\bar{q}\\ |
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| 251 | K_{2} &= 0,61\cdot\bar{\theta} |
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| 252 | \end{align*} |
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| 253 | \end{minipage}\\ \par\medskip |
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| 254 | } |
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| 255 | \item<3->{Saturated grid box ($\bar{q}_{l} \neq 0$)\\ \par\medskip |
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| 256 | \begin{minipage}[c][2.2cm][c]{0.64\textwidth} |
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| 257 | \begin{align*} |
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| 258 | K_{1} &= \frac{1,0 - \bar{q} + 1,61\cdot\bar{q}_{s}\left(1,0 + 0,622\frac{L_{v}}{R T}\right)}{1,0 + 0,622\frac{L_{v}}{R T}\frac{L_{v}}{c_{p} T} \bar{q}_{s}}\\ |
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| 259 | K_{2} &= \theta \left(\frac{L_{v}}{c_{p} T}\cdot K_{1} -1,0\right) |
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| 260 | \end{align*} |
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| 261 | \end{minipage} |
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| 262 | } |
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| 263 | \end{itemize} |
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| 264 | } |
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| 265 | \end{itemize} |
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| 266 | \end{frame} |
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| 267 | |
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| 268 | % Folie 11 |
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| 269 | \begin{frame} |
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| 270 | \frametitle{Sources / Sinks (I)} |
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| 271 | |
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| 272 | \begin{itemize} |
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| 273 | \item<1->{Radiation model (based on Cox, 1976) $\Rightarrow$ scheme of effective emissivity\\ \par\medskip |
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| 274 | \begin{itemize} |
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| 275 | \item<2->Very simple, accounts only for absorbtion and emission of long-wave radiation due to water vapour and cloud droplets and neglects horizontal divergences of radiation\\ |
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| 276 | \begin{minipage}[c][1.5cm][c]{0.35\textwidth} |
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| 277 | \begin{equation*} |
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| 278 | \left(\frac{\partial\bar{\theta}_{l}}{\partial t}\right)_{\text{RAD}} = \left(\frac{\theta}{T}\right) \frac{1}{\varrho c_{p} \Delta z}\left[ \Delta F(z^{+}) - \Delta F(z^{-}) \right] |
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| 279 | \end{equation*} |
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| 280 | \end{minipage}\\ \par\medskip |
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| 281 | \begin{tabbing} |
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| 282 | $\Delta F$: \qquad \=Difference between upward and downward irradiance at\\ |
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| 283 | \>grid points above ($z^{+}$) and below ($z^{-}$) the level in\\ |
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| 284 | \>which $\bar{\theta}_{l}$ is defined. |
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| 285 | \end{tabbing} |
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| 286 | Further information: cloud\_physics.pdf |
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| 287 | |
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| 288 | \end{itemize} |
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| 289 | } |
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| 290 | \end{itemize} |
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| 291 | \end{frame} |
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| 292 | |
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| 293 | % Folie 12 |
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| 294 | \begin{frame} |
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| 295 | \frametitle{Sources / Sinks (II)} |
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| 296 | |
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| 297 | \begin{itemize} |
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| 298 | \item<1->{Precipitation model (based on Kessler, 1969)\\ \par\medskip |
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| 299 | \begin{itemize} |
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| 300 | \item<2->{Simplified scheme which accounts only for the process of autoconversion for the formation of rain water.\\ |
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| 301 | \begin{minipage}[c][1.5cm][c]{0.44\textwidth} |
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| 302 | \begin{align*} |
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| 303 | \left(\frac{\partial\bar{q}}{\partial t}\right)_{\text{PREC}} = |
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| 304 | \begin{cases} |
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| 305 | (\bar{q}_{l}-\bar{q}_{l_{\text{crit}}})/\tau & \text{if } \bar{q}_{l} > \bar{q}_{l_{\text{crit}}} \\ |
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| 306 | 0 & \text{if } \bar{q}_{l} \leq \bar{q}_{l_{\text{crit}}} |
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| 307 | \end{cases} |
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| 308 | \end{align*} |
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| 309 | \end{minipage}\\ \par\medskip |
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| 310 | } |
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| 311 | \item<3->{precipitation leaves grid box immediately if the threshold $\bar{q}_{l_{\text{crit}}} = \SI{0,5}{g/kg}$ is exceeded.}\\ \par\medskip |
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| 312 | \item<4->{Timescale $\tau = \SI{1000}{s}$.} |
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| 313 | \item<5->{ |
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| 314 | \begin{minipage}[c][1.5cm][c]{0.35\textwidth} |
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| 315 | \begin{equation*} |
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| 316 | \left(\frac{\partial\bar{\theta}_{l}}{\partial t}\right)_{\text{PREC}} = \frac{L_{v}}{c_{p}}\left(\frac{\theta}{T}\right) \left(\frac{\partial\bar{q}}{\partial t}\right)_{\text{PREC}} |
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| 317 | \end{equation*} |
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| 318 | \end{minipage} |
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| 319 | } |
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| 320 | \end{itemize} |
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| 321 | } |
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| 322 | \end{itemize} |
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| 323 | \end{frame} |
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| 324 | |
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| 325 | % Folie 13 |
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| 326 | \begin{frame} |
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| 327 | \frametitle{Control parameters} |
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| 328 | |
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| 329 | \begin{itemize} |
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| 330 | \item<1->{The following settings in the parameter file enable the use of the bulk cloud model:}\\ \par\medskip |
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| 331 | \scriptsize |
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| 332 | \begin{itemize}\scriptsize |
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| 333 | \item<2->{ |
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| 334 | $\left. |
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| 335 | \begin{array}{ll} % fÌr mehrzeiligen Text nötig |
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| 336 | \text{humidity = .TRUE.}\qquad\qquad\qquad |
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| 337 | \end{array} |
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| 338 | \right\}: |
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| 339 | \begin{array}{ll} % fÌr mehrzeiligen Text nötig |
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| 340 | \text{prognostic equations for specific} \\ \text{specific humidity } \bar{q} \text{ is solved} |
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| 341 | \end{array} |
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| 342 | $ |
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| 343 | }\\ \par\medskip |
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| 344 | \item<3->{ |
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| 345 | $\left. |
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| 346 | \begin{array}{ll} % fÌr mehrzeiligen Text nötig |
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| 347 | \text{humidity = .TRUE.}\qquad\qquad\qquad \\ \text{cloud\_physics = .TRUE.} |
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| 348 | \end{array} |
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| 349 | \right\}: |
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| 350 | \begin{array}{ll} % fÌr mehrzeiligen Text nötig |
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| 351 | \text{prognostic equations for liquid water} \\ \text{potential temperature } \bar{\theta}_{l} \text{ and total water} \\ \text{specific humidity } \bar{q} \text{ are solved} |
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| 352 | \end{array} |
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| 353 | $ |
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| 354 | }\\ \par\medskip |
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| 355 | \item<4->{ |
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| 356 | $\left. |
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| 357 | \begin{array}{ll} % fÌr mehrzeiligen Text nötig |
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| 358 | \text{humidity = .TRUE.}\qquad\qquad\qquad \\ \text{cloud\_physics = .TRUE.} \\ \text{precipitation = .TRUE.} \\ \text{radiation = .TRUE.} |
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| 359 | \end{array} |
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| 360 | \right\}: |
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| 361 | \begin{array}{ll} % fÌr mehrzeiligen Text nötig |
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| 362 | \text{Kessler precipitation scheme and} \\ \text{radiation model are solved} |
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| 363 | \end{array} |
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| 364 | $ |
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| 365 | } |
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| 366 | \end{itemize} |
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| 367 | \end{itemize} |
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| 368 | \end{frame} |
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| 369 | |
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| 370 | % Folie 12 |
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| 371 | \begin{frame} |
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| 372 | \frametitle{Example - Setup for a cloudy boundary layer} |
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| 373 | |
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| 374 | \begin{figure}[H] |
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| 375 | \begin{minipage}[c][6.5cm][c]{.50\linewidth} |
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| 376 | \centering |
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| 377 | CBL with shallow cumulus clouds:\\ \par\bigskip |
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| 378 | \includegraphics[width=0.95\linewidth]{cloud_physics_figures/cbl5_preview.png} |
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| 379 | \end{minipage} |
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| 380 | \begin{minipage}[c][6.5cm][t]{.40\linewidth} |
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| 381 | \centering |
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| 382 | \includegraphics[width=0.9\linewidth]{cloud_physics_figures/param_clouds.png} |
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| 383 | \end{minipage} |
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| 384 | \end{figure} |
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| 385 | \end{frame} |
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| 386 | |
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| 387 | % Folie 13 |
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| 388 | \begin{frame} |
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| 389 | \frametitle{Example - Model output} |
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| 390 | |
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| 391 | \begin{figure}[H] |
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| 392 | \begin{minipage}[c][6cm][c]{.45\linewidth} |
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| 393 | \centering |
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| 394 | \includegraphics[width=0.95\linewidth]{cloud_physics_figures/profiles_cbl_cloud.png} |
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| 395 | \end{minipage} |
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| 396 | \begin{minipage}[c][6cm][c]{.45\linewidth} |
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| 397 | \centering |
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| 398 | \includegraphics[width=0.95\linewidth]{cloud_physics_figures/ql_xy_cbl_cloud.png} |
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| 399 | \end{minipage} |
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| 400 | \end{figure} |
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| 401 | \end{frame} |
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| 402 | |
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| 403 | % Folie 1$ |
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| 404 | \begin{frame} |
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| 405 | \frametitle{Bibliography} |
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| 406 | |
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| 407 | \tiny |
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| 408 | \begin{thebibliography}{} |
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| 409 | \bibitem[1]{betts1973} |
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| 410 | \textsc{Betts, A.K., 1973:} \emph{Non-precipitating cumulus convection and its parameterization.} |
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| 411 | \newblock Quart. J. Roy. Meteor. Soc., \textbf{99}, 178-196. |
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| 412 | \bibitem[2]{cox1976} |
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| 413 | \textsc{Cox, S. K., 1976:} \emph{Observations of cloud infrared effective emissivity.} |
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| 414 | \newblock J. Atmos. Sci., \textbf{33}, 287-289. |
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| 415 | \bibitem[3]{cuijpers1993} |
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| 416 | \textsc{Cuijpers, J.W.M., P.G. Duynkerke, 1993:} \emph{Large eddy simulation of trade wind cumulus clouds.} |
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| 417 | \newblock J. Atmos. Sci., \textbf{50}, 3894-3908. |
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| 418 | \bibitem[4]{deardorff1976} |
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| 419 | \textsc{Deardorff, J. W., 1976:} \emph{Usefullness of liquid-water potential temperature in shallow-cloud model.} |
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| 420 | \newblock J. Appl. Meteor., \textbf{15}, 98-102. |
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| 421 | \bibitem[5]{deardorff1980} |
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| 422 | \textsc{Deardorff, J. W., 1980:} \emph{Stratocumulus-capped mixed layers derived from a three-dimensional model}. |
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| 423 | \newblock Bondary-Layer Meteor., \textbf{18}, 495-527. |
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| 424 | \bibitem[6]{kessler1969} |
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| 425 | \textsc{Kessler, E., 1969:} \emph{On the distribution and continuity of water substance in atmospheric circulations.} |
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| 426 | \newblock Meteor. Monogr., \textbf{32}, 84 pp. |
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| 427 | \bibitem[7]{riechelmann2012} |
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| 428 | \textsc{Riechelmann, T., Y. Noh, S. Raasch, 2012:} \emph{A new method for large-eddy simulations of clouds with Lagrangian droplets including the effects of turbulent collision.} |
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| 429 | \newblock New J. Phys., \textbf{14}, 27. |
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| 430 | \bibitem[8]{sommeria1977} |
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| 431 | \textsc{Sommeria, G., J. W. Deardorff, 1977:} \emph{Subgrid-scale condensation in models of nonprecipitating clouds.} |
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| 432 | \newblock J. Atmos. Sci., \textbf{34}, 344-355. |
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| 433 | \bibitem[9]{cloudphys} |
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| 434 | \textsc{cloud\_physics.pdf:} \emph{Introduction to the cloud physics model of PALM.} |
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| 435 | \newblock {\tt trunk/DOC/tec/methods/cloud\_physics/cloud\_physics.pdf}. |
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| 436 | \end{thebibliography} |
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| 437 | \end{frame} |
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| 438 | |
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[1515] | 439 | \end{document} |
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