Changes between Version 20 and Version 21 of doc/tec/noncyclic

Timestamp:

Nov 12, 2015 1:28:46 PM (9 years ago)

Author:

gronemeier

Comment:

--

doc/tec/noncyclic

@@ -81 +81 @@
 ''Left-right flow''
 
-If the outflow is defined at the right boundary (i = nx + 1, see Fig. 1), the phase velocity for each velocity components is calculated by
+If the outflow is defined at the right boundary (i = nx + 1, see Fig. 1), the phase velocity for each velocity component is calculated by
 {{{
 #!Latex
@@ -115 +115 @@
 \begin{tabular}{|c |c |c |c| c|}
 \hline
-  & Right-left flow  &\multicolumn{2}{c|}{ South-north flow} & North-south flow \\
+            & Right-left flow          & \multicolumn{2}{c|}{ North-south flow}        & South-north flow \\
 \hline
-  & $(nx + 1) \rightarrow 0$ & $(nx + 1) \rightarrow -1$   &  &  \\
- $\psi = u$ &   $nx \rightarrow 1$   &  $nx \rightarrow 0$ & &\\
-  & $(nx - 1) \rightarrow 2$ &  $(nx - 1) \rightarrow 1$   & & \\
+            & $(nx + 1) \rightarrow 0$ & $(nx + 1) \rightarrow -1$ &                   &  \\
+ $\psi = u$ & $ nx      \rightarrow 1$ & $ nx      \rightarrow  0$ &                   &  \\
+            & $(nx - 1) \rightarrow 2$ & $(nx - 1) \rightarrow  1$ &                   &  \\
 \cline{1-3}
-   & $(nx + 1) \rightarrow -1$ & $(nx + 1) \rightarrow 0$ &  &  $i \rightarrow j$  \\
- $\psi = v$ &   $nx \rightarrow 0$   &  $nx \rightarrow 1$ & $i \rightarrow j$ &   \\
-  & $(nx - 1) \rightarrow 1$ &  $(nx - 1) \rightarrow 2$  &  &  $nx \rightarrow ny$ \\
+            & $(nx + 1) \rightarrow -1$ & $(nx + 1) \rightarrow 0$ &                   & $i \rightarrow j$    \\
+ $\psi = v$ & $ nx      \rightarrow  0$ & $ nx      \rightarrow 1$ & $i \rightarrow j$ &                      \\
+            & $(nx - 1) \rightarrow  1$ & $(nx - 1) \rightarrow 2$ &                   &  $nx \rightarrow ny$ \\
 \cline{1-3}
-   & $(nx + 1) \rightarrow -1$ & $(nx + 1) \rightarrow -1$ &  &    \\
- $\psi = w$ &   $nx \rightarrow 0$   &  $nx \rightarrow 0$ & & \\
-  & $(nx - 1) \rightarrow 1$ &  $(nx - 1) \rightarrow 1$  &  &  \\
+            & $(nx + 1) \rightarrow -1$ & $(nx + 1) \rightarrow -1$ &                  & \\
+ $\psi = w$ & $ nx      \rightarrow  0$ & $ nx      \rightarrow  0$ &                  & \\
+            & $(nx - 1) \rightarrow  1$ & $(nx - 1) \rightarrow  1$ &                  & \\
 \hline
 \end{tabular}