******* 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 ( 0 0) spectra using (K,p) = (-34/2,4) (-34/2,4) 
 (-34/2,4) (-34/2,4) (-34/2,4) (-34/2,2) (-34/2,2) 
 (-34/2,2) (-34/2,2) (-34/2,2) (-44/2,4) (-44/2,4) 
 (-44/2,4) (-44/2,4) (-44/2,4) (-44/2,2) (-44/2,2) 
 (-44/2,2) (-44/2,2) (-44/2,2) (-58/2,2) (-58/2,2) 
 (-58/2,2) (-58/2,2) (-58/2,2) (-80/2,2) (-80/2,2) 
 (-80/2,2) (-80/2,2) (-80/2,2) 
 with multi=3 & 3.
Winding ( 1 0) spectra using (K,p) = (-17/2,5) (-17/2,5) 
 (-17/2,5) (-17/2,5) (-17/2,5) (-17/2,3) (-17/2,3) 
 (-17/2,3) (-17/2,3) (-17/2,3) (-19/2,5) (-19/2,5) 
 (-19/2,5) (-19/2,5) (-19/2,5) (-19/2,3) (-19/2,3) 
 (-19/2,3) (-19/2,3) (-19/2,3) (-43/2,3) (-43/2,3) 
 (-43/2,3) (-43/2,3) (-65/2,3) (-65/2,3) (-65/2,3) 
 (-65/2,3) (-65/2,3) (-65/2,3) 
 with multi=15 & 15.
Winding ( 1 1) spectra using (K,p) = (-30/2,4) (-30/2,4) 
 (-30/2,4) (-30/2,4) (-30/2,4) (-30/2,2) (-30/2,2) 
 (-30/2,2) (-30/2,2) (-30/2,2) (-36/2,4) (-36/2,4) 
 (-36/2,4) (-36/2,4) (-36/2,4) (-36/2,2) (-36/2,2) 
 (-36/2,2) (-36/2,2) (-36/2,2) (-50/2,2) (-50/2,2) 
 (-50/2,2) (-50/2,2) (-50/2,2) (-80/2,2) (-80/2,2) 
 (-80/2,2) (-80/2,2) (-80/2,2) 
 with multi=17 & 17.
Orientation symmetry indefinite
Heavy sources, K_max =  2 4 6 8 10 2 4 6
  8 10 2 4 6 8 10 2 4 6 8 10 2 4 6
  8 10 2 4 6 8 10
Result format:  winding number then momenta (or separation)
 then spectra in units of the string tension

0 0 
 0.000000e+00
  -1.08578112746121e+01
 9.000000e-01
  -8.60247157755855e+00
 1.800000e+00
  -7.39425055835211e+00
 2.700000e+00
  -6.40018329814237e+00
 3.600000e+00
  -5.67941383902863e+00
 4.500000e+00
  -4.94262516529323e+00
 5.400000e+00
  -4.31851800015661e+00
 6.300000e+00
  -3.65012227061597e+00
 7.200000e+00
  -2.93773388649111e+00
 8.100000e+00
  -2.30363996342655e+00
 9.000000e+00
  -1.60395402629144e+00

1 0 
 0.000000e+00
  -7.57511001525383e+00
 9.000000e-01
  -6.81701032277122e+00
 1.800000e+00
  -6.07476883373922e+00
 2.700000e+00
  -5.41603288281148e+00
 3.600000e+00
  -4.79365946686468e+00
 4.500000e+00
  -4.19878811072787e+00
 5.400000e+00
  -3.73507675802363e+00
 6.300000e+00
  -3.74769473612573e+00
 7.200000e+00
  -3.93115125603129e+00
 8.100000e+00
  -4.07574353273148e+00
 9.000000e+00
  -4.19386508123204e+00

1 1 
 0.000000e+00
  -4.39032786811755e+00
 9.000000e-01
  -4.22678131932043e+00
 1.800000e+00
  -3.85553646359267e+00
 2.700000e+00
  -3.39500244786196e+00
 3.600000e+00
  -2.88617543904996e+00
 4.500000e+00
  -2.34489636615877e+00
 5.400000e+00
  -1.77961893849225e+00
 6.300000e+00
  -1.21172243632755e+00
 7.200000e+00
  -6.74069481978022e-01
 8.100000e+00
  -1.99578432841163e-01
 9.000000e+00
   1.79578058302627e-01