******* 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

11.4617271
0.001967542671 1 0.3909839522 -0.01250282378 -0.06421231123 353.2492529 0.07049127522 160.6273835 -0.7123520719 -0.6519355869 
0 0   0.000000e+00
      3.8179826337133e-10
0 0   5.000000e-01
         0.37267374431141
0 0   1.000000e+00
          0.6512025751658
0 0   1.500000e+00
         0.88894662021989
0 0   2.000000e+00
          1.1024909733997
0 0   2.500000e+00
          1.2903288384719
0 0   3.000000e+00
          1.4650462395709
0 0   3.500000e+00
          1.6307889752556
0 0   4.000000e+00
          1.7841983307863
0 0   4.500000e+00
          1.9315374153227
0 0   5.000000e+00
          2.0767798510726
0 0   5.500000e+00
            2.22210760615
0 0   6.000000e+00
          2.3784668424916
0 0   6.500000e+00
          2.5567190760009
0 0   7.000000e+00
          2.7638416597318
0 0   7.500000e+00
          3.0100014894857
1 0   0.000000e+00
          1.9870109010657
1 0   5.000000e-01
          1.9268576507228
1 0   1.000000e+00
          1.9391602547829
1 0   1.500000e+00
          2.0063727643962
1 0   2.000000e+00
          2.1136579900631
1 0   2.500000e+00
          2.2553003003605
1 0   3.000000e+00
          2.4292280280895
1 0   3.500000e+00
          2.6349244472284
1 0   4.000000e+00
          2.8736187691354
1 0   4.500000e+00
          3.1472436424982
1 0   5.000000e+00
           3.456468451403
1 0   5.500000e+00
          3.8041310732722
1 0   6.000000e+00
          4.1891368942578
1 0   6.500000e+00
           4.595783410829
1 0   7.000000e+00
          5.0037553787096
1 0   7.500000e+00
          5.3964791339627
1 1   0.000000e+00
          3.6101690463483
1 1   5.000000e-01
          3.6333536833411
1 1   1.000000e+00
          3.7013724091726
1 1   1.500000e+00
          3.8100051123728
1 1   2.000000e+00
          3.9536782062607
1 1   2.500000e+00
          4.1269389199193
1 1   3.000000e+00
          4.3250908382604
1 1   3.500000e+00
          4.5442477974185
1 1   4.000000e+00
          4.7815132202318
1 1   4.500000e+00
          5.0355729607858
1 1   5.000000e+00
           5.307505385632
1 1   5.500000e+00
          5.6013598600235
1 1   6.000000e+00
          5.9239717613433
1 1   6.500000e+00
          6.2840837911183
1 1   7.000000e+00
           6.691171766476
1 1   7.500000e+00
          7.1537405094457