******* Eigenvalues for the 3+1 transverse lattice  *******
Couplings:  m^2, G^2 N, t/a^2, la_1/a^2, la_2/a^2
           la_3/a^2, la_4/a^2, la_5/a^2, tau     
For heavy sources, K<0, divide by sqrt(G^2 N).
 0.0517766953 1 0.7584261311 -0.07623059914 -0.1458991891 8.889796764 0.1608104465 1.657995607 -3.268403913
Overall scale G^2 N/sigma = 8.099820052, particle truncation c_p=-1.174339527
Winding ( 2 0) spectra using (K,p) = (28/2,4) (28/2,6) 
 (40/2,4) (60/2,4) 
 with multi=15.
Winding ( 3 0) spectra using (K,p) = (23/2,5) (23/2,7) 
 (25/2,5) (59/2,5) 
 with multi=15.
Winding ( 4 0) spectra using (K,p) = (20/2,6) (20/2,8) 
 (28/2,6) (40/2,6) 
 with multi=15.
Winding ( 5 0) spectra using (K,p) = (19/2,7) (19/2,9) 
 (25/2,7) (33/2,7) 
 with multi=15.
Winding ( 2 0) spectra using (K,p) = (28/2,4) (28/2,6) 
 (40/2,4) (60/2,4) 
 with multi=16.
Winding ( 3 0) spectra using (K,p) = (23/2,5) (23/2,7) 
 (25/2,5) (59/2,5) 
 with multi=16.
Winding ( 4 0) spectra using (K,p) = (20/2,6) (20/2,8) 
 (28/2,6) (40/2,6) 
 with multi=16.
Winding ( 5 0) spectra using (K,p) = (19/2,7) (19/2,9) 
 (25/2,7) (33/2,7) 
 with multi=16.
Winding ( 1 1) spectra using (K,p) = (28/2,4) (28/2,6) 
 (40/2,4) (60/2,4) 
 with multi=17.
Winding ( 2 2) spectra using (K,p) = (18/2,6) (18/2,8) 
 (24/2,6) (34/2,6) 
 with multi=17.
Winding ( 1 1) spectra using (K,p) = (28/2,4) (28/2,6) 
 (40/2,4) (60/2,4) 
 with multi=18.
Winding ( 2 2) spectra using (K,p) = (18/2,6) (18/2,8) 
 (24/2,6) (34/2,6) 
 with multi=18.
Winding ( 3 2) spectra using (K,p) = (15/2,7) (15/2,9) 
 (19/2,7) (23/2,7) 
 with multi=0.
Winding ( 2 1) spectra using (K,p) = (19/2,5) (19/2,7) 
 (31/2,5) (41/2,5) 
 with multi=0.
Winding ( 3 1) spectra using (K,p) = (16/2,6) (16/2,8) 
 (22/2,6) (30/2,6) 
 with multi=0.
Winding ( 4 1) spectra using (K,p) = (15/2,7) (15/2,9) 
 (19/2,7) (25/2,7) 
 with multi=0.
Orientation symmetry -1
Result format:  winding number then momenta (or separation)
 then spectra in units of the string tension

2 0 
 0.000000e+00
   6.36077475284170e+01
   6.68054774453885e+01
   8.06542882150030e+01
   9.69672959517039e+01

3 0 
 0.000000e+00
   8.27903782167554e+01
   8.03878008357558e+01
   1.10672739847509e+02
   1.12080620210213e+02

4 0 
 0.000000e+00
   1.00390526209589e+02
   1.22536806300287e+02
   1.40482132637987e+02
   1.36605536550701e+02

5 0 
 0.000000e+00
   1.25060977001326e+02
   1.74950526437000e+02
   1.74687696880390e+02
   1.66244096007279e+02

2 0 
 0.000000e+00
   3.74819850291043e+01
   6.05525714569894e+01
   7.48097968046079e+01
   8.78812253543549e+01

3 0 
 0.000000e+00
   5.75346828719079e+01
   8.24307363623344e+01
   9.44252543472143e+01
   9.96076435994171e+01

4 0 
 0.000000e+00
   8.72833153364235e+01
   1.13959220529757e+02
   1.25785815933445e+02
   1.33478423242319e+02

5 0 
 0.000000e+00
   1.25023816987914e+02
   1.53375178708785e+02
   1.62445888619718e+02
   1.75754521374997e+02

1 1 
 0.000000e+00
   4.24704030207849e+01
   5.80360126748488e+01
   6.83682988762171e+01
   7.27654448583216e+01

2 2 
 0.000000e+00
   6.83684261797747e+01
   6.97513468476274e+01
   1.07827615451187e+02
   1.03827058997784e+02

1 1 
 0.000000e+00
   4.22471770059702e+01
   5.69456658473870e+01
   6.71799082809003e+01
   7.28492791220500e+01

2 2 
 0.000000e+00
   5.61789964449588e+01
   7.46129407894462e+01
   8.60965383572947e+01
   9.77075021166083e+01

3 2 
 0.000000e+00
   7.69334916309374e+01
   9.36592876759434e+01
   1.09343644216609e+02
   1.07083412282296e+02

2 1 
 0.000000e+00
   4.93662688933942e+01
   6.20094228341257e+01
   5.60109509257247e+01
   7.90714805605622e+01

3 1 
 0.000000e+00
   5.97930854013420e+01
   8.17251069852739e+01
   9.11953354318103e+01
   9.30834991010944e+01

4 1 
 0.000000e+00
   7.90545722387998e+01
   1.07439421666145e+02
   1.25491724939506e+02
   1.19666320398423e+02