# This file is in Maple format 
#             Numerical approximation : 
sol:={u[1,2] = .5000000000+1.322875656*I, u[1,3] = .2500000000+.6614378278*I, u[1,4] = .7500000000+.6614378278*I, u[2,1] = .5000000000+1.322875656*I, u[2,3] = .7500000000+.6614378278*I, u[2,4] = .2500000000+.6614378278*I, u[3,1] = .2500000000+.6614378278*I, u[3,2] = .7500000000+.6614378278*I, u[3,4] = .5000000000+1.322875656*I, u[4,1] = .7500000000+.6614378278*I, u[4,2] = .2500000000+.6614378278*I, u[4,3] = .5000000000+1.322875656*I, v[1,2] = .3750000000+.3307189139*I, v[1,3] = 1.250000000+.6614378278*I, v[1,4] = -.5000000000+1.322875656*I, v[2,1] = .3750000000+.3307189139*I, v[2,3] = -.5000000000+1.322875656*I, v[2,4] = 1.250000000+.6614378278*I, v[3,1] = 1.250000000+.6614378278*I, v[3,2] = -.5000000000+1.322875656*I, v[3,4] = .3750000000+.3307189139*I, v[4,1] = -.5000000000+1.322875656*I, v[4,2] = 1.250000000+.6614378278*I, v[4,3] = .3750000000+.3307189139*I, w[1,2] = .5000000000+1.322875656*I, w[1,3] = .2500000000+.6614378278*I, w[1,4] = .7500000000+.6614378278*I, w[2,1] = .5000000000+1.322875656*I, w[2,3] = .7500000000+.6614378278*I, w[2,4] = .2500000000+.6614378278*I, w[3,1] = .2500000000+.6614378278*I, w[3,2] = .7500000000+.6614378278*I, w[3,4] = .5000000000+1.322875656*I, w[4,1] = .7500000000+.6614378278*I, w[4,2] = .2500000000+.6614378278*I, w[4,3] = .5000000000+1.322875656*I}:
#             Matrix Generators : 
 lM:=[array(1 .. 3, 1 .. 3,[(1, 3)=0.,(3, 1)=0.,(3, 2)=0.,(2, 2)=1.,(3, 3)=1.,(1, 1)=1.,(1, 2)=0.,(2, 1)=0.,(2, 3)=0.]), array(1 .. 3, 1 .. 3,[(1, 3)=0.,(3, 1)=0.,(3, 2)=0.,(2, 2)=1.,(3, 3)=1.,(1, 1)=1.,(1, 2)=0.,(2, 1)=0.,(2, 3)=0.]), array(1 .. 3, 1 .. 3,[(1, 3)=-1.250000000-.6614378279*I,(3, 1)=-.6250000000+.3307189140*I,(3, 2)=0.,(2, 2)=1.000000000-.3145751311e-9*I,(3, 3)=0.,(1, 1)=-2.499999999+1.322875654*I,(1, 2)=-3.999999998+.9708497374e-9*I,(2, 1)=1.250000001-.6614378283*I,(2, 3)=0.]), array(1 .. 3, 1 .. 3,[(1, 3)=1.250000000+.6614378285*I,(3, 1)=.6250000008-.3307189140*I,(3, 2)=.5000000004-1.322875656*I,(2, 2)=1.750000001-.6614378272*I,(3, 3)=-.2499999998-.6614378279*I,(1, 1)=1.249999999+.6614378278*I,(1, 2)=2.500000000+1.322875655*I,(2, 1)=1.000000001+.3437253934e-9*I,(2, 3)=.7500000001-.6614378276*I]), array(1 .. 3, 1 .. 3,[(1, 3)=0.,(3, 1)=.1250000007+.9921567419*I,(3, 2)=1.499999999+1.322875654*I,(2, 2)=1.000000000-.6614378276e-10*I,(3, 3)=.9999999992+.1457513122e-10*I,(1, 1)=1.000000002+.4192810856e-9*I,(1, 2)=.3958251311e-9+.4488235110e-9*I,(2, 1)=.7500000002+.6614378276*I,(2, 3)=0.]), array(1 .. 3, 1 .. 3,[(1, 3)=-1.250000001-.6614378293*I,(3, 1)=-.6250000003+.3307189142*I,(3, 2)=-.3307189140e-10-.6249999997e-10*I,(2, 2)=1.000000001+.2864378274e-9*I,(3, 3)=0.,(1, 1)=-5.000000000-2.645751313*I,(1, 2)=-4.999999999-2.645751316*I,(2, 1)=2.000000001-.8856217241e-10*I,(2, 3)=0.])]:
#             Boundary Holonomy : 
 lMb:=[array(1 .. 3, 1 .. 3,[(1, 3)=-1.500000016+1.322875671*I,(3, 1)=1.124999998-1.653594566*I,(3, 2)=-3.000000009-2.645751296*I,(2, 2)=4.000000017+2.645751289*I,(3, 3)=-1.499999999+1.322875664*I,(1, 1)=.4999999988-3.968626960*I,(1, 2)=-5.000000033-2.645751296*I,(2, 1)=-1.000000001+2.645751305*I,(2, 3)=1.500000009-1.322875660*I]), array(1 .. 3, 1 .. 3,[(1, 3)=10.49999998-9.260129605*I,(3, 1)=-7.875000003+11.57516199*I,(3, 2)=-.2023132474e-8+21.16601046*I,(2, 2)=-19.99999993-18.52025890*I,(3, 3)=4.499999997+6.614378286*I,(1, 1)=18.50000001+11.90588090*I,(1, 2)=34.99999996-2.645751450*I,(2, 1)=-3.500000004-17.19738354*I,(2, 3)=-10.49999999-1.322875656*I])]: