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documentation:details:aqgc [2013/07/23 15:10]
feigl |
documentation:details:aqgc [2017/04/19 17:20]
Michael Rauch |
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| \begin{eqnarray*} | \begin{eqnarray*} |
| f_{S,0,1} &=& f_{S,0,1}^\textrm{\'Eboli} \\ | f_{S,0,1} &=& f_{S,0,1}^\textrm{Éboli} \\ |
| f_{M,0,1} &=& - \frac{1}{g^2} \cdot f_{M,0,1}^\textrm{\'Eboli} \\ | f_{M,0,1} &=& - \frac{1}{g^2} \cdot f_{M,0,1}^\textrm{Éboli} \\ |
| f_{M,2,3} &=& - \frac{4}{g'^2} \cdot f_{M,2,3}^\textrm{\'Eboli} \\ | f_{M,2,3} &=& - \frac{4}{g'^2} \cdot f_{M,2,3}^\textrm{Éboli} \\ |
| f_{M,4,5} &=& - \frac{2}{g g'} \cdot f_{M,4,5}^\textrm{\'Eboli} \\ | f_{M,4,5} &=& - \frac{2}{g g'} \cdot f_{M,4,5}^\textrm{Éboli} \\ |
| f_{M,6,7} &=& - \frac{1}{g^2} \cdot f_{M,6,7}^\textrm{\'Eboli} \\ | f_{M,6,7} &=& - \frac{1}{g^2} \cdot f_{M,6,7}^\textrm{Éboli} \\ |
| f_{T,0,1,2} &=& \frac{1}{g^4} \cdot f_{T,0,1,2}^\textrm{\'Eboli}\\ | f_{T,0,1,2} &=& \frac{1}{g^4} \cdot f_{T,0,1,2}^\textrm{Éboli}\\ |
| f_{T,5,6,7} &=& \frac{4}{g^2 g'^2} \cdot f_{T,5,6,7}^\textrm{\'Eboli}\\ | f_{T,5,6,7} &=& \frac{4}{g^2 g'^2} \cdot f_{T,5,6,7}^\textrm{Éboli}\\ |
| f_{T,8,9} &=& \frac{16}{g'^4} \cdot f_{T,8,9}^\textrm{\'Eboli} | f_{T,8,9} &=& \frac{16}{g'^4} \cdot f_{T,8,9}^\textrm{Éboli} |
| \end{eqnarray*} | \end{eqnarray*} |
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