********* Eigenvalues for the 3+1 transverse lattice ********* Couplings: 0:mu^2 1:g^2 N 2:beta 3:lambda_1 4:lambda_2 5:lambda_3 6:lambda_4 7:lambda_5 8:tau_1 9:tau_2 10:kappa_S 11:kappa_A 12:mu_F 13:mu_0^2 14:mu_1^2 15:mu_2^2 16:mu_3^2 Use chi^2 fit with 40 criteria and tolerance 0.01. Overall scale from minimizing chi^2. Parity doublets (charge,multi,state) with error for difference over average. ( 1, 5,0) and ( 1, 6,0), error 0.25 (-1, 5,0) and (-1, 6,0), error 0.25 (-1, 7,0) and (-1, 4,0), error 0.25 Spectrum for P_perp a = (0,0), ( 0.25 0) using 4 states (multiplet, charge, c^2 error for each) = (15, 1, 0.25 2 2 2) (15, -1, 0.25 2 2 2) (16, -1, 0.25 2 2 2) (16, 1, 0.25 2 2 2) Spectrum for P_perp a = (0,0), ( 0.25 0.25) using 4 states (multiplet, charge, c^2 error for each) = (17, 1, 0.25 2 2 2) (17, -1, 0.25 2 2 2) (18, -1, 0.25 2 2 2) (18, 1, 0.25 2 2 2). Ordinary spectra multiplets, 4 states, (charge,multiplet) = ( 1, 3) (-1, 3) ( 1, 4) (-1, 4) ( 1, 5) (-1, 5) ( 1, 6) (-1, 6) (-1, 7) ( 1, 7) . All spectra extrapolated using (K,p) = (12/2,8) (12/2,6) (14/2,6) (18/2,6) . Winding potential using (n,K,p) = ( 2 0,16/2,6) ( 2 0,16/2,4) ( 2 0,26/2,4) ( 3 0,17/2,7) ( 3 0,17/2,5) ( 3 0,25/2,5) ( 4 0,16/2,8) ( 4 0,16/2,6) ( 4 0,26/2,6) . Roundness of winding using (n,K,p) = ( 2 2,14/2,8) ( 2 2,14/2,6) ( 2 2,22/2,6) with error 1; in G^2 N units. Heavy potential determined using (n,K,p,K_max) = ( 0 0,26/2,2,3.5) ( 0 0,26/2,4,3.5) ( 0 0,26/2,2,3) ( 0 0,42/2,2,3.5) ( 0 0,42/2,2,4.25) ( 0 0,70/2,2,4) ( 0 0,70/2,2,4.5) , L = 3.577-2.726*m 5.058-3.856*m 7.154-5.452*m (all in G^2 N units); relative scale error=0.1. Roundness determined using (n,K,p,K_max) = ( 1 0,13/2,3,3.5) ( 1 0,13/2,5,3.5) ( 1 0,13/2,3,3) ( 1 0,23/2,3,4) ( 1 0,23/2,3,4.5) ( 1 0,35/2,3,5) ( 1 0,35/2,3,6) L=1.265-0.964*m and error 0.1; ( 1 0,13/2,3,3.5) ( 1 0,13/2,5,3.5) ( 1 0,13/2,3,3) ( 1 0,23/2,3,4) ( 1 0,23/2,3,4.5) ( 1 0,35/2,3,5) ( 1 0,35/2,3,6) L=5.058-3.856*m and error 0.1; ( 1 1,22/2,2,5) ( 1 1,22/2,4,5) ( 1 1,22/2,2,4.5) ( 1 1,44/2,2,5) ( 1 1,44/2,2,6) ( 1 1,70/2,2,6) ( 1 1,70/2,2,7) L=0+0*m and error 0.2; all in G^2 N units. p-extrapolation using n=( 1 0) and (K,p) = (13/2,3) (21/2,3) (45/2,3) (13/2,5) (27/2,5) (13/2,7) (15/2,7) . Result format: Fit info, # steps, chi^2, and p damping, scale G^2 N/sigma. The 17 couplings (G^2 N units); which couplings -- if any -- were fit. Winding potential and heavy souce potential fits. Roundness of winding potential, 1 values, and roundness of heavy source potential, 3 values, (G^2 N units) showing measured value and derived value for each. The rescaled spectrum for each P_perp*a and c^2 values. Finally come the states for the ordinary spectra. 2 47 41.11271956 -7.405718459 10.87789992 0.007919222016 1 0.5326762378 0.01775371321 -0.07418286807 317567.9956 0.1602594987 101376.392 -0.713469443 -0.6189492363 0 0 0 0 0 0 0 2 3 4 5 6 7 8 9 0.181914 -0.637520 -0.205666 0.055046 0.600334 -0.913677 1.259703 0.792081 0.570776 0.672979 0.908081 0.826323 1.072878 0.822255 14.415726 14.454328 1.222175 27.466417 27.486920 0.649152 28.245399 28.254306 0.282011 36.344973 36.397960 1.677635 30.812145 30.829152 0.538470 57.432848 57.496909 2.028264 72.004151 72.004858 0.022368 78.435271 78.447768 0.395663 30.812145 30.854529 1.341942 39.306279 39.329426 0.732872 57.432848 57.452325 0.616665 72.004151 72.077023 2.307221 36.344973 36.373766 0.911626 42.873518 42.852211 -0.674605 65.404227 65.442875 1.223665 71.684412 71.688215 0.120394 14.415726 14.492938 1.222312 28.245399 28.262094 0.264284 36.344973 36.382689 0.597072 36.878244 36.847222 -0.491099 30.812145 30.851796 0.627699 57.432848 57.484863 0.823437 72.004151 72.164277 2.534907 80.075200 80.114430 0.621042 30.812145 30.890812 1.245359 39.306279 39.353204 0.742852 57.432848 57.547481 1.814724 72.004151 72.009686 0.087624 27.466417 27.508220 0.661779 36.344973 36.279290 -1.039807 36.637949 36.705241 1.065272 56.501411 56.605856 1.653443 14.415726 28.245399 36.878244 48.330218 88.003720 119.716087 106.695386 127.541860 88.828746 80.738102 120.610644 137.504478 39.306279 80.534743 101.248939 109.475398 27.466417 36.637949 60.919111 56.501411 78.435271 91.341783 123.033017 123.925864 42.873518 104.610504 104.070581 120.075478 89.470597 80.075200 112.166031 119.699572 30.812145 57.432848 72.004151 105.138443 36.344973 65.404227 71.684412 97.388146 2 94 15.31313103 -7.4879979 9.750444631 0.01800590693 1 0.3779340298 -0.02325160356 -0.0932917629 72138.00391 0.05441363355 28545.41651 0.03199285008 2.360047783 0 0 0 0 0 0 0 2 3 4 5 6 7 8 9 0.232415 -0.511344 -0.158908 0.102948 0.690641 -1.210877 2.282082 1.328116 0.907175 0.938090 1.185625 1.178182 1.157991 1.192860 21.402355 21.434025 1.148272 29.912705 29.932632 0.722532 29.982344 30.008824 0.960124 37.674963 37.643067 -1.156517 32.354169 32.372851 0.677374 61.514047 61.554944 1.482860 70.642939 70.661932 0.688631 76.013784 76.011682 -0.076220 32.354169 32.385846 1.148556 40.063836 40.070387 0.237531 61.514047 61.524383 0.374749 70.642939 70.659252 0.591491 37.674963 37.697156 0.804659 42.693750 42.677231 -0.598979 66.773745 66.803355 1.073629 69.865576 69.871988 0.232505 21.402355 21.465725 1.148837 29.982344 30.031178 0.885316 37.674963 37.637953 -0.670965 39.258524 39.229879 -0.519320 32.354169 32.392340 0.692022 61.514047 61.547978 0.615143 70.642939 70.678474 0.644222 81.087525 81.113450 0.469992 32.354169 32.416422 1.128599 40.063836 40.077293 0.243967 61.514047 61.582298 1.237329 70.642939 70.676525 0.608877 29.912705 29.956668 0.797018 37.674963 37.693378 0.333845 39.238969 39.197471 -0.752324 55.092974 55.086532 -0.116790 21.402355 29.982344 39.258524 48.454325 87.429180 97.399948 109.143737 112.199350 77.776303 88.373135 108.946140 113.248258 40.063836 76.831696 94.497368 104.038130 29.912705 39.238969 55.092974 63.605671 76.013784 89.769848 115.436470 112.286592 42.693750 95.171336 102.160869 107.736760 88.094248 81.087525 109.706430 107.780271 32.354169 61.514047 70.642939 92.163745 37.674963 66.773745 69.865576 85.461513