******* 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 6.651322009 0.1072401379 1 1.009994691 -0.00729168206 -0.1435818867 60.68327765 0.1625519907 9.60935071 -0.7883196908 -0.7342659374 0 0 0.000000e+00 -1.3467552480517e-09 0 0 5.000000e-01 0.29886195866664 0 0 1.000000e+00 0.55524718106539 0 0 1.500000e+00 0.79841527046885 0 0 2.000000e+00 1.0348928925178 0 0 2.500000e+00 1.2614202738792 0 0 3.000000e+00 1.4838407925915 0 0 3.500000e+00 1.7033074330933 0 0 4.000000e+00 1.916561196993 0 0 4.500000e+00 2.1264553506421 0 0 5.000000e+00 2.3337380094588 0 0 5.500000e+00 2.537323669214 0 0 6.000000e+00 2.741715637956 0 0 6.500000e+00 2.9513627439074 0 0 7.000000e+00 3.1688718518291 0 0 7.500000e+00 3.4009060394172 1 0 0.000000e+00 1.8525584844453 1 0 5.000000e-01 1.8157100860972 1 0 1.000000e+00 1.8367282694592 1 0 1.500000e+00 1.9017914534504 1 0 2.000000e+00 1.9971216415827 1 0 2.500000e+00 2.1156628434756 1 0 3.000000e+00 2.2552132683965 1 0 3.500000e+00 2.417113966096 1 0 4.000000e+00 2.6059223618781 1 0 4.500000e+00 2.8281557900614 1 0 5.000000e+00 3.0907801143653 1 0 5.500000e+00 3.4018955846172 1 0 6.000000e+00 3.762322000384 1 0 6.500000e+00 4.1488120414794 1 0 7.000000e+00 4.5357326951497 1 0 7.500000e+00 4.9071938977421 1 1 0.000000e+00 3.4420556732942 1 1 5.000000e-01 3.4616384260814 1 1 1.000000e+00 3.5193045146641 1 1 1.500000e+00 3.6117738180635 1 1 2.000000e+00 3.734225479923 1 1 2.500000e+00 3.8815540014226 1 1 3.000000e+00 4.049235278422 1 1 3.500000e+00 4.2334775487136 1 1 4.000000e+00 4.4307932777953 1 1 4.500000e+00 4.6349628701733 1 1 5.000000e+00 4.8021102055033 1 1 5.500000e+00 4.9493563329389 1 1 6.000000e+00 5.1366307830484 1 1 6.500000e+00 5.3788422057037 1 1 7.000000e+00 5.684064868324 1 1 7.500000e+00 6.0908903193598