******* Eigenvalues for the 3+1 transverse lattice  *******
Couplings:  m^2, G^2 N, beta, la_1, la_2, la3, la4, la5,
            tau_1, tau_2
For heavy sources, K<0, divide by sqrt(G^2 N).
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:
 overall scale G^2 N/sigma,
 the 10 couplings,
 winding number,  momenta (or separation)
   spectra in units of the string tension

9.669785336
0.03249196962 1 0.7317766758 -0.03327406461 -0.08809601245 220.8666429 0.1669097664 94.36589102 -0.9688626138 -0.8735016911 
0 0   0.000000e+00
      4.2797661882061e-10
0 0   5.000000e-01
         0.34329255289575
0 0   1.000000e+00
          0.6030501366167
0 0   1.500000e+00
         0.82977463747341
0 0   2.000000e+00
          1.0390062699694
0 0   2.500000e+00
          1.2289379963268
0 0   3.000000e+00
          1.4104632771667
0 0   3.500000e+00
          1.5865325522665
0 0   4.000000e+00
          1.7532156399594
0 0   4.500000e+00
          1.9157960649614
0 0   5.000000e+00
          2.0771910730737
0 0   5.500000e+00
          2.2384921903686
0 0   6.000000e+00
          2.4091898672414
0 0   6.500000e+00
          2.5986375535477
0 0   7.000000e+00
          2.8126585883125
0 0   7.500000e+00
          3.0607274441553
1 0   0.000000e+00
          1.9396048991129
1 0   5.000000e-01
          1.8690329593214
1 0   1.000000e+00
           1.867057657469
1 0   1.500000e+00
          1.9189564465754
1 0   2.000000e+00
          2.0099358034738
1 0   2.500000e+00
          2.1332918910563
1 0   3.000000e+00
          2.2869143341985
1 0   3.500000e+00
          2.4709304414708
1 0   4.000000e+00
          2.6875008708238
1 0   4.500000e+00
          2.9400716947575
1 0   5.000000e+00
          3.2306966962105
1 0   5.500000e+00
          3.5622938149815
1 0   6.000000e+00
          3.9342613834611
1 0   6.500000e+00
           4.332285118122
1 0   7.000000e+00
          4.7366942467242
1 0   7.500000e+00
          5.1308103291522
1 1   0.000000e+00
          3.6411085754985
1 1   5.000000e-01
          3.6634218546924
1 1   1.000000e+00
          3.7289993076595
1 1   1.500000e+00
          3.8338973363913
1 1   2.000000e+00
          3.9725826333109
1 1   2.500000e+00
          4.1393208146033
1 1   3.000000e+00
          4.3288405272014
1 1   3.500000e+00
          4.5361116514506
1 1   4.000000e+00
          4.7556207813736
1 1   4.500000e+00
          4.9808758727709
1 1   5.000000e+00
          5.2077598806268
1 1   5.500000e+00
          5.4430655157791
1 1   6.000000e+00
          5.6991141257094
1 1   6.500000e+00
          5.9900146672986
1 1   7.000000e+00
           6.333896002204
1 1   7.500000e+00
          6.7574482128354