1# BEGIN ARRANGEMENT 2# number_of_vertices 39 4# number_of_edges 512 6# number_of_faces 75 8# BEGIN VERTICES 90 2 0 100 3 0 111 2 0 121 3 0 130 4 0 144 4 1 Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])],0),--,--,--,4) 150 4 0 160 4 0 171 4 0 18# END VERTICES 19# BEGIN EDGES 207 1 0 0 211 3 0 0 228 2 1 0 232 0 1 0 244 0 1 0 255 4 1 1 Arc_2(Point_2(--,--, P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])], 0,0),Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])],0),--,--,--,4),P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])],0,0,0,0,1) 266 4 1 0 275 6 1 1 Arc_2(Point_2(--,--, P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])], 1,0),Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])],0),--,--,--,4),P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])],1,1,0,0,1) 287 6 1 0 295 7 1 1 Arc_2(Point_2(--,--, P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])], 2,0),Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])],0),--,--,--,4),P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])],2,2,0,0,1) 308 3 0 0 318 5 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])],0),--,--,--,4),Point_2(--,--, P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])], 0,1),P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])],0,0,0,0,1) 32# END EDGES 33# BEGIN FACES 34# BEGIN FACE 351 0 36# number_of_outer_ccbs 370 38# number_of_inner_ccbs 391 40# halfedges_on_inner_ccb 418 420 2 21 4 6 9 13 17 43# number_of_isolated_vertices 440 45# END FACE 46# BEGIN FACE 471 1 48# number_of_outer_ccbs 491 50# halfedges_on_outer_ccb 513 5214 12 11 53# number_of_inner_ccbs 540 55# number_of_isolated_vertices 560 57# END FACE 58# BEGIN FACE 591 1 60# number_of_outer_ccbs 611 62# halfedges_on_outer_ccb 633 6418 16 15 65# number_of_inner_ccbs 660 67# number_of_isolated_vertices 680 69# END FACE 70# BEGIN FACE 711 1 72# number_of_outer_ccbs 731 74# halfedges_on_outer_ccb 755 7622 10 8 7 5 77# number_of_inner_ccbs 780 79# number_of_isolated_vertices 800 81# END FACE 82# BEGIN FACE 831 1 84# number_of_outer_ccbs 851 86# halfedges_on_outer_ccb 875 8823 20 3 1 19 89# number_of_inner_ccbs 900 91# number_of_isolated_vertices 920 93# END FACE 94# END FACES 95# END ARRANGEMENT 96# BEGIN CURVES 97# number_of_curves 981 99P[7(0,P[6(6,-8)])(1,P[3(3,16)])(2,P[5(5,-8)])(3,P[2(2,8)])(5,P[1(1,-2)])(7,P[0(0,1)])] 100# induced_edges 1014 10223 19 15 11 103# END CURVES 104 105