# This file is in Maple format 
#             Numerical approximation : 
sol:={u[1,2] = .5549581321-.9427583472e-100*I, u[1,3] = 2.246979604+.1685516694e-99*I, u[1,4] = -.8019377358-.7427583472e-100*I, u[2,1] = .5549581321-.9427583472e-100*I, u[2,3] = -.8019377358-.7427583472e-100*I, u[2,4] = 2.246979604+.1685516694e-99*I, u[3,1] = 2.246979604+.1685516694e-99*I, u[3,2] = -.8019377358-.7427583472e-100*I, u[3,4] = .5549581321-.9427583472e-100*I, u[4,1] = -.8019377358-.7427583472e-100*I, u[4,2] = 2.246979604+.1685516694e-99*I, u[4,3] = .5549581321-.9427583472e-100*I, v[1,2] = 2.246979604+.1685516694e-99*I, v[1,3] = -.8019377358-.7427583472e-100*I, v[1,4] = .5549581321-.9427583472e-100*I, v[2,1] = 2.246979604+.1685516694e-99*I, v[2,3] = .5549581321-.9427583472e-100*I, v[2,4] = -.8019377358-.7427583472e-100*I, v[3,1] = -.8019377358-.7427583472e-100*I, v[3,2] = .5549581321-.9427583472e-100*I, v[3,4] = 2.246979604+.1685516694e-99*I, v[4,1] = .5549581321-.9427583472e-100*I, v[4,2] = -.8019377358-.7427583472e-100*I, v[4,3] = 2.246979604+.1685516694e-99*I, w[1,2] = .6431041321+.2e-100*I, w[1,3] = 2.801937736+.7427583472e-100*I, w[1,4] = -.5549581321+.9427583472e-100*I, w[2,1] = .6431041321+.2e-100*I, w[2,3] = -.5549581321+.9427583472e-100*I, w[2,4] = 2.801937736+.7427583472e-100*I, w[3,1] = 2.801937736+.7427583472e-100*I, w[3,2] = -.5549581321+.9427583472e-100*I, w[3,4] = .6431041321+.2e-100*I, w[4,1] = -.5549581321+.9427583472e-100*I, w[4,2] = 2.801937736+.7427583472e-100*I, w[4,3] = .6431041321+.2e-100*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.,(3, 1)=-1.000000000+.2246183432e-101*I,(3, 2)=-2.000000000+.2246183432e-101*I,(2, 2)=-3.048917343-.7483697157e-99*I,(3, 3)=-1.,(1, 1)=-16.39373164-.5987527227e-98*I,(1, 2)=8.097834686+.1432187388e-98*I,(2, 1)=-4.048917343-.7483697159e-99*I,(2, 3)=1.]), array(1 .. 3, 1 .. 3,[(1, 3)=1.000000000+0.*I,(3, 1)=1.000000000-.2246183486e-101*I,(3, 2)=0.,(2, 2)=-1.000000000+.2246183457e-101*I,(3, 3)=0.,(1, 1)=1.554958132-.2915345679e-99*I,(1, 2)=-2.493959207+.2337925714e-99*I,(2, 1)=1.246979604-.1182967581e-99*I,(2, 3)=0.]), array(1 .. 3, 1 .. 3,[(1, 3)=.1980622644-.8426021410e-100*I,(3, 1)=.1980622643-.4383428759e-100*I,(3, 2)=.3961245284-.1280945016e-99*I,(2, 2)=.6038754717+.1236021349e-99*I,(3, 3)=.1980622644-.8426021410e-100*I,(1, 1)=3.246979602+.1881794161e-98*I,(1, 2)=-1.603875472-.3503908854e-99*I,(2, 1)=.8019377366+.3934192078e-100*I,(2, 3)=-.1980622644+.8426021410e-100*I]), array(1 .. 3, 1 .. 3,[(1, 3)=-.3079785284+.1504952438e-99*I,(3, 1)=-1.000000012-.2071235519e-99*I,(3, 2)=1.603875468+.9424489101e-100*I,(2, 2)=.9118539988-.775720691e-100*I,(3, 3)=-.6431041313+.5612227898e-100*I,(1, 1)=-.1980622628-.2020221074e-100*I,(1, 2)=.4939592069-.9424953266e-100*I,(2, 1)=-.4450418646-.8245094094e-100*I,(2, 3)=-.4450418684+.1329088989e-99*I])]:
#             Boundary Holonomy : 
 lMb:=[array(1 .. 3, 1 .. 3,[(1, 3)=3.246979604+.6097074527e-100*I,(3, 1)=0.,(3, 2)=0.,(2, 2)=1.,(3, 3)=1.000000000+.1541417392e-99*I,(1, 1)=1.000000000-.1541417392e-99*I,(1, 2)=-3.603875473+.1788107998e-99*I,(2, 1)=0.,(2, 3)=-1.801937736-.7427583464e-100*I]), array(1 .. 3, 1 .. 3,[(1, 3)=.6431041320-.1341872178e-100*I,(3, 1)=0.,(3, 2)=0.,(2, 2)=1.,(3, 3)=.9999999998+.8823327921e-100*I,(1, 1)=1.000000000-.8823327924e-100*I,(1, 2)=1.603875471-.8568916845e-100*I,(2, 1)=0.,(2, 3)=.8019377358+.2611171248e-100*I])]:
#             Basis Change fo PU(2,1) : 
 A:=array(1 .. 3, 1 .. 3,[(1, 3)=0.,(3, 1)=0.,(3, 2)=0.,(2, 2)=-1.,(3, 3)=1.,(1, 1)=-2.000000000+.2246183431e-101*I,(1, 2)=0.,(2, 1)=0.,(2, 3)=0.]):