The first two samples are chosen to demonstrate that the Polyakov loop is 1 or -1 near one of the monopole constituent centers. ======================= SU2 .3 .5 0 0 .31 0 20 ======================= nu1=0.6,r1=(0,0,0.314159),nu2=0.4,r2=(0,0,-0.471239),X=(x,y,z,t)=(0,0,0.31,0),nt=20 A[1][0]= 0.000000E+00, A[2][0]= 0.000000E+00, A[3][0]=-2.198382E+00, A[1][1]= 0.000000E+00, A[2][1]= 6.489211E+00, A[3][1]= 0.000000E+00, A[1][2]=-6.489211E+00, A[2][2]= 0.000000E+00, A[3][2]= 0.000000E+00, A[1][3]= 0.000000E+00, A[2][3]= 0.000000E+00, A[3][3]= 0.000000E+00, B[1][1]=-1.020045E+01, B[1][2]= 0.000000E+00, B[1][3]= 0.000000E+00 B[2][1]= 0.000000E+00, B[2][2]=-1.020045E+01, B[2][3]= 0.000000E+00 B[3][1]= 0.000000E+00, B[3][2]= 0.000000E+00, B[3][3]= 1.025989E+01 B1^2(X)=1.040491E+02, B2^2(X)=1.040491E+02, B3^2(X)=1.052652E+02 SFsq(X)=3.1336350411E+02 SPsi(X)=3.1336350411E+02 Nzmsq(X)=4.6769508188E-01 Pol(X)=9.9538254213E-01 ======================= SU2 .3 .5 0 0 -.47 0 20 ======================= nu1=0.6,r1=(0,0,0.314159),nu2=0.4,r2=(0,0,-0.471239),X=(x,y,z,t)=(0,0,-0.47,0),nt=20 A[1][0]= 0.000000E+00, A[2][0]= 0.000000E+00, A[3][0]= 7.131583E+00, A[1][1]= 0.000000E+00, A[2][1]=-3.992689E+00, A[3][1]= 0.000000E+00, A[1][2]= 3.992689E+00, A[2][2]= 0.000000E+00, A[3][2]= 0.000000E+00, A[1][3]= 0.000000E+00, A[2][3]= 0.000000E+00, A[3][3]= 0.000000E+00, B[1][1]=-5.479452E+00, B[1][2]= 0.000000E+00, B[1][3]= 0.000000E+00 B[2][1]= 0.000000E+00, B[2][2]=-5.479452E+00, B[2][3]= 0.000000E+00 B[3][1]= 0.000000E+00, B[3][2]= 0.000000E+00, B[3][3]= 5.657372E+00 B1^2(X)=3.002439E+01, B2^2(X)=3.002439E+01, B3^2(X)=3.200586E+01 SFsq(X)=9.2054641248E+01 SPsi(X)=9.2054641248E+01 Nzmsq(X)=1.2315843088E+00 Pol(X)=-9.9399694066E-01 ======================== SU2 .3 .5 .2 .1 .3 .1 20 ======================== nu1=0.6,r1=(0,0,0.314159),nu2=0.4,r2=(0,0,-0.471239),X=(x,y,z,t)=(0.2,0.1,0.3,0.1),nt=20 A[1][0]=-1.554127E+00, A[2][0]=-1.310116E+00, A[3][0]= 7.725524E-01, A[1][1]= 2.241820E-01, A[2][1]= 3.123598E+00, A[3][1]=-1.286089E+00, A[1][2]=-3.123598E+00, A[2][2]= 2.241820E-01, A[3][2]= 2.572177E+00, A[1][3]= 1.310116E+00, A[2][3]=-1.554127E+00, A[3][3]= 6.004994E-01, B[1][1]=-3.599570E+00, B[1][2]= 1.177254E+00, B[1][3]= 6.462814E+00 B[2][1]= 3.434901E+00, B[2][2]=-5.760142E+00, B[2][3]= 2.915022E+00 B[3][1]= 5.526248E+00, B[3][2]= 4.409105E+00, B[3][3]= 2.082548E+00 B1^2(X)=5.529487E+01, B2^2(X)=5.400536E+01, B3^2(X)=5.460232E+01 SFsq(X)=1.6390254873E+02 SPsi(X)=1.6390254873E+02 Nzmsq(X)=2.9458816943E-01 Pol(X)=6.5042657564E-01