Dynamical matrix file
default                                                                    
  2    3   4   6.6889056   0.0000000   1.8864952   0.0000000   0.0000000   0.0000000
           1  'Ti  '    43628.1015848821     
           2  'Se  '    71967.6374358595     
    1    1      0.0000000000     -0.0000000000      0.0000000000
    2    2      0.4971371341      0.2870222582      1.4407269033
    3    2      0.0000000000      0.5740445164      0.4349667022

     Dynamical  Matrix in cartesian axes

     q = (    0.000000000  -0.580675059   0.000000000 ) 

    1    1
 -0.02399230   0.00000000    -0.00000000   0.00000000     0.00000000   0.00000000
 -0.00000000   0.00000000     0.27581746   0.00000000    -0.06219601   0.00000000
  0.00000000   0.00000000    -0.06219601   0.00000000     0.09899172   0.00000000
    1    2
  0.03593916  -0.00000000     0.00000000  -0.00000000    -0.00000000   0.00000000
  0.00000000  -0.00000000     0.00870606  -0.00000000     0.06830216  -0.00000000
 -0.00000000   0.00000000     0.04329182  -0.00000000    -0.02691014   0.00000000
    1    3
 -0.03593916   0.00000000    -0.00000000   0.00000000     0.00000000  -0.00000000
 -0.00000000   0.00000000    -0.00870606   0.00000000    -0.06830216   0.00000000
  0.00000000  -0.00000000    -0.04329182   0.00000000     0.02691014  -0.00000000
    2    1
  0.03593916   0.00000000     0.00000000   0.00000000    -0.00000000  -0.00000000
  0.00000000   0.00000000     0.00870606   0.00000000     0.04329182   0.00000000
 -0.00000000  -0.00000000     0.06830216   0.00000000    -0.02691014  -0.00000000
    2    2
  0.07453420   0.00000000     0.00000000   0.00000000    -0.00000000   0.00000000
  0.00000000   0.00000000     0.17283933   0.00000000     0.00337270   0.00000000
 -0.00000000   0.00000000     0.00337270   0.00000000     0.15316000   0.00000000
    2    3
  0.03545514  -0.00000000     0.00000000  -0.00000000     0.00000000  -0.00000000
  0.00000000  -0.00000000     0.02691477  -0.00000000    -0.02074512   0.00000000
  0.00000000  -0.00000000    -0.02074512   0.00000000     0.00434339  -0.00000000
    3    1
 -0.03593916  -0.00000000    -0.00000000  -0.00000000     0.00000000   0.00000000
 -0.00000000  -0.00000000    -0.00870606  -0.00000000    -0.04329182  -0.00000000
  0.00000000   0.00000000    -0.06830216  -0.00000000     0.02691014   0.00000000
    3    2
  0.03545514   0.00000000     0.00000000   0.00000000     0.00000000   0.00000000
  0.00000000   0.00000000     0.02691477   0.00000000    -0.02074512  -0.00000000
  0.00000000   0.00000000    -0.02074512  -0.00000000     0.00434339   0.00000000
    3    3
  0.07453420   0.00000000     0.00000000   0.00000000    -0.00000000   0.00000000
  0.00000000   0.00000000     0.17283933   0.00000000     0.00337270   0.00000000
 -0.00000000   0.00000000     0.00337270   0.00000000     0.15316000   0.00000000

     Dynamical  Matrix in cartesian axes

     q = (    0.502879352  -0.290337529   0.000000000 ) 

    1    1
  0.20086502   0.00000000    -0.12982143   0.00000000    -0.05386332   0.00000000
 -0.12982143   0.00000000     0.05096014   0.00000000     0.03109800   0.00000000
 -0.05386332   0.00000000     0.03109800   0.00000000     0.09899172   0.00000000
    1    2
  0.01551434  -0.00000000     0.01179228  -0.00000000     0.05915141  -0.00000000
  0.01179228  -0.00000000     0.02913088  -0.00000000    -0.03415108   0.00000000
  0.03749182  -0.00000000    -0.02164591   0.00000000    -0.02691014   0.00000000
    1    3
  0.01551434  -0.00000000     0.01179228  -0.00000000     0.05915141  -0.00000000
  0.01179228  -0.00000000     0.02913088  -0.00000000    -0.03415108   0.00000000
  0.03749182  -0.00000000    -0.02164591   0.00000000    -0.02691014   0.00000000
    2    1
  0.01551434   0.00000000     0.01179228   0.00000000     0.03749182   0.00000000
  0.01179228   0.00000000     0.02913088   0.00000000    -0.02164591  -0.00000000
  0.05915141   0.00000000    -0.03415108  -0.00000000    -0.02691014  -0.00000000
    2    2
  0.14826305   0.00000000    -0.04256737   0.00000000     0.00292084   0.00000000
 -0.04256737   0.00000000     0.09911048   0.00000000    -0.00168635   0.00000000
  0.00292084   0.00000000    -0.00168635   0.00000000     0.15316000   0.00000000
    2    3
 -0.02904986  -0.00000000    -0.00369809  -0.00000000     0.01796580   0.00000000
 -0.00369809  -0.00000000    -0.03332005  -0.00000000    -0.01037256  -0.00000000
  0.01796580   0.00000000    -0.01037256  -0.00000000    -0.00434339  -0.00000000
    3    1
  0.01551434   0.00000000     0.01179228   0.00000000     0.03749182   0.00000000
  0.01179228   0.00000000     0.02913088   0.00000000    -0.02164591  -0.00000000
  0.05915141   0.00000000    -0.03415108  -0.00000000    -0.02691014  -0.00000000
    3    2
 -0.02904986   0.00000000    -0.00369809   0.00000000     0.01796580  -0.00000000
 -0.00369809   0.00000000    -0.03332005   0.00000000    -0.01037256   0.00000000
  0.01796580  -0.00000000    -0.01037256   0.00000000    -0.00434339   0.00000000
    3    3
  0.14826305   0.00000000    -0.04256737   0.00000000     0.00292084   0.00000000
 -0.04256737   0.00000000     0.09911048   0.00000000    -0.00168635   0.00000000
  0.00292084   0.00000000    -0.00168635   0.00000000     0.15316000   0.00000000

     Dynamical  Matrix in cartesian axes

     q = (   -0.502879352  -0.290337529   0.000000000 ) 

    1    1
  0.20086502   0.00000000     0.12982143   0.00000000     0.05386332   0.00000000
  0.12982143   0.00000000     0.05096014   0.00000000     0.03109800   0.00000000
  0.05386332   0.00000000     0.03109800   0.00000000     0.09899172   0.00000000
    1    2
 -0.01551434  -0.00000000     0.01179228   0.00000000     0.05915141   0.00000000
  0.01179228   0.00000000    -0.02913088  -0.00000000     0.03415108   0.00000000
  0.03749182   0.00000000     0.02164591   0.00000000     0.02691014   0.00000000
    1    3
  0.01551434   0.00000000    -0.01179228  -0.00000000    -0.05915141  -0.00000000
 -0.01179228  -0.00000000     0.02913088   0.00000000    -0.03415108  -0.00000000
 -0.03749182  -0.00000000    -0.02164591  -0.00000000    -0.02691014  -0.00000000
    2    1
 -0.01551434   0.00000000     0.01179228  -0.00000000     0.03749182  -0.00000000
  0.01179228  -0.00000000    -0.02913088   0.00000000     0.02164591  -0.00000000
  0.05915141  -0.00000000     0.03415108  -0.00000000     0.02691014  -0.00000000
    2    2
  0.14826305   0.00000000     0.04256737   0.00000000    -0.00292084   0.00000000
  0.04256737   0.00000000     0.09911048   0.00000000    -0.00168635   0.00000000
 -0.00292084   0.00000000    -0.00168635   0.00000000     0.15316000   0.00000000
    2    3
  0.02904986   0.00000000    -0.00369809  -0.00000000     0.01796580   0.00000000
 -0.00369809  -0.00000000     0.03332005   0.00000000     0.01037256   0.00000000
  0.01796580   0.00000000     0.01037256   0.00000000     0.00434339   0.00000000
    3    1
  0.01551434  -0.00000000    -0.01179228   0.00000000    -0.03749182   0.00000000
 -0.01179228   0.00000000     0.02913088  -0.00000000    -0.02164591   0.00000000
 -0.05915141   0.00000000    -0.03415108   0.00000000    -0.02691014   0.00000000
    3    2
  0.02904986  -0.00000000    -0.00369809   0.00000000     0.01796580  -0.00000000
 -0.00369809   0.00000000     0.03332005  -0.00000000     0.01037256  -0.00000000
  0.01796580  -0.00000000     0.01037256  -0.00000000     0.00434339  -0.00000000
    3    3
  0.14826305   0.00000000     0.04256737   0.00000000    -0.00292084   0.00000000
  0.04256737   0.00000000     0.09911048   0.00000000    -0.00168635   0.00000000
 -0.00292084   0.00000000    -0.00168635   0.00000000     0.15316000   0.00000000

     Diagonalizing the dynamical matrix

     q = (    0.000000000  -0.580675059   0.000000000 ) 

 **************************************************************************
     freq (    1) =      -3.390941 [THz] =    -113.109607 [cm-1]
 ( -0.915347  0.000000 -0.000000  0.000000 -0.000000  0.000000 ) 
 (  0.284727  0.000000  0.000000  0.000000  0.000000  0.000000 ) 
 ( -0.284727  0.000000 -0.000000  0.000000 -0.000000  0.000000 ) 
     freq (    2) =       2.683796 [THz] =      89.521809 [cm-1]
 ( -0.000000  0.000000 -0.086168  0.000000 -0.751039  0.000000 ) 
 ( -0.000000  0.000000  0.397624  0.000000 -0.236965  0.000000 ) 
 (  0.000000  0.000000 -0.397624  0.000000  0.236965  0.000000 ) 
     freq (    3) =       3.379881 [THz] =     112.740699 [cm-1]
 (  0.587314  0.000000 -0.000000  0.000000 -0.000000  0.000000 ) 
 (  0.572303  0.000000  0.000000  0.000000 -0.000000  0.000000 ) 
 ( -0.572303  0.000000 -0.000000  0.000000  0.000000  0.000000 ) 
     freq (    4) =       4.067071 [THz] =     135.662874 [cm-1]
 (  0.000000  0.000000 -0.000000  0.000000 -0.000000  0.000000 ) 
 (  0.707107  0.000000 -0.000000  0.000000  0.000000  0.000000 ) 
 (  0.707107  0.000000 -0.000000  0.000000 -0.000000  0.000000 ) 
     freq (    5) =       4.097997 [THz] =     136.694459 [cm-1]
 (  0.000000  0.000000 -0.476868  0.000000 -0.317684  0.000000 ) 
 ( -0.000000  0.000000  0.124142  0.000000  0.566061  0.000000 ) 
 ( -0.000000  0.000000 -0.124142  0.000000 -0.566061  0.000000 ) 
     freq (    6) =       4.769730 [THz] =     159.101073 [cm-1]
 ( -0.000000  0.000000  0.000000  0.000000  0.000000  0.000000 ) 
 ( -0.000000  0.000000 -0.238549  0.000000 -0.665653  0.000000 ) 
 ( -0.000000  0.000000 -0.238549  0.000000 -0.665653  0.000000 ) 
     freq (    7) =       5.565687 [THz] =     185.651323 [cm-1]
 (  0.000000  0.000000  0.000000  0.000000 -0.000000  0.000000 ) 
 ( -0.000000  0.000000 -0.665653  0.000000  0.238549  0.000000 ) 
 ( -0.000000  0.000000 -0.665653  0.000000  0.238549  0.000000 ) 
     freq (    8) =       5.751576 [THz] =     191.851926 [cm-1]
 ( -0.000000  0.000000 -0.191249  0.000000 -0.720473  0.000000 ) 
 ( -0.000000  0.000000 -0.466251  0.000000 -0.069143  0.000000 ) 
 (  0.000000  0.000000  0.466251  0.000000  0.069143  0.000000 ) 
     freq (    9) =       8.957091 [THz] =     298.776393 [cm-1]
 (  0.000000  0.000000 -0.918121  0.000000  0.299065  0.000000 ) 
 ( -0.000000  0.000000  0.001341  0.000000 -0.183861  0.000000 ) 
 (  0.000000  0.000000 -0.001341  0.000000  0.183861  0.000000 ) 
 **************************************************************************
