These Thurston maps are NET maps for every choice of translation term. They are primitive and have degree 11. PURE MODULAR GROUP HURWITZ EQUIVALENCE CLASSES FOR TRANSLATIONS {0} {lambda1} {lambda2} {lambda1+lambda2} These pure modular group Hurwitz classes each contain only finitely many Thurston equivalence classes. However, this modular group Hurwitz class contains infinitely many Thurston equivalence classes. The number of pure modular group Hurwitz classes in this modular group Hurwitz class is 24. ALL THURSTON MULTIPLIERS c/d IN UNREDUCED FORM 0/11, 1/11, 1/1, 2/1, 3/1, 4/1, 5/1, 8/1, 9/1 EXCLUDED INTERVALS FOR THE HALF-SPACE COMPUTATION (-infinity,0.000000) ( 0.000000,0.109508) ( 0.113257,0.113901) ( 0.114401,0.116201) ( 0.121212,0.123077) ( 0.125000,infinity) The half-space computation does not determine rationality. EXCLUDED INTERVALS FOR JUST THE SUPPLEMENTAL HALF-SPACE COMPUTATION INTERVAL COMPUTED FOR HST OR EXTENDED HST (-0.054103,0.023539) 0/1 EXTENDED HST ( 0.109410,0.110129) 8/73 HST ( 0.109571,0.110565) 13/118 HST ( 0.110553,0.110599) 23/208 HST ( 0.110464,0.110771) 24/217 HST ( 0.110764,0.111441) 1/9 EXTENDED HST ( 0.111342,0.111543) 187/1678 HST ( 0.111443,0.111690) 27/242 HST ( 0.111574,0.111950) 20/179 HST ( 0.111763,0.112391) 13/116 HST ( 0.112082,0.112860) 9/80 HST ( 0.112544,0.113182) 7/62 HST ( 0.113178,0.113236) 6/53 EXTENDED HST ( 0.113013,0.113417) 47/415 HST ( 0.112295,0.114793) 4/35 EXTENDED HST -> HST ( 0.115190,0.117035) 5/43 EXTENDED HST -> HST ( 0.116788,0.117647) 13/111 HST ( 0.117544,0.117754) 2/17 EXTENDED HST ( 0.117731,0.117808) 57/484 HST ( 0.117771,0.117906) 39/331 HST ( 0.117834,0.118022) 27/229 HST ( 0.117918,0.118209) 17/144 HST ( 0.118084,0.118969) 11/93 HST ( 0.118312,0.119637) 5/42 EXTENDED HST -> HST ( 0.119627,0.119807) 14/117 HST ( 0.119667,0.121824) 4/33 EXTENDED HST -> HST ( 0.122769,0.123658) 8/65 HST ( 0.123449,0.124101) 12/97 HST ( 0.123377,0.125000) 18/145 HST ( 0.124352,0.125714) 1/8 EXTENDED HST The supplemental half-space computation shows that these NET maps are rational. SLOPE FUNCTION INFORMATION NUMBER OF FIXED POINTS: 6 EQUATOR? FIXED POINT c d 0 lambda1 lambda2 lambda1+lambda2 -8/1 1 11 Yes Yes No No 0/1 1 11 Yes Yes No No -20/3 1 11 Yes Yes No No -42/5 1 11 Yes Yes No No -80/9 1 11 Yes Yes No No -60/7 1 11 Yes Yes No No NUMBER OF EQUATORS: 6 6 0 0 There are no more slope function fixed points. Number of excluded intervals computed by the fixed point finder: 1114 No nontrivial cycles were found. The slope function maps some slope to the nonslope. The slope function orbit of every slope p/q with |p| <= 50 and |q| <= 50 ends in either one of the above cycles or the nonslope. If the slope function maps slope p/q to slope p'/q', then |q'| <= |q| for every slope p/q with |p| <= 50 and |q| <= 50. FUNDAMENTAL GROUP WREATH RECURSIONS When the translation term of the affine map is 0: NewSphereMachine( "a=<1,b,b,b,b,b,b^-1,b^-1,b^-1,b^-1,b^-1>(2,11)(3,10)(4,9)(5,8)(6,7)", "b=(1,11)(2,10)(3,9)(4,8)(5,7)", "c=<1,c^-1,c^-1,c^-1,c^-1,c^-1,c,c,c,c,c*d>(2,11)(3,10)(4,9)(5,8)(6,7)", "d=<1,1,c^-1,c^-1,c^-1,c^-1,c,c,c,c,c>(1,2)(3,11)(4,10)(5,9)(6,8)", "a*b*c*d"); When the translation term of the affine map is lambda1: NewSphereMachine( "a=(1,11)(2,10)(3,9)(4,8)(5,7)", "b=(1,10)(2,9)(3,8)(4,7)(5,6)", "c=(1,11)(2,10)(3,9)(4,8)(5,7)", "d=<1,c^-1,c^-1,c^-1,c^-1,c^-1,c,c,c,c,c*d>(2,11)(3,10)(4,9)(5,8)(6,7)", "a*b*c*d"); When the translation term of the affine map is lambda2: NewSphereMachine( "a=(1,11)(2,10)(3,9)(4,8)(5,7)", "b=<1,c^-1,c^-1,c^-1,c^-1,c^-1,c,c,c,c,c*d>(2,11)(3,10)(4,9)(5,8)(6,7)", "c=(1,11)(2,10)(3,9)(4,8)(5,7)", "d=(1,10)(2,9)(3,8)(4,7)(5,6)", "a*b*c*d"); When the translation term of the affine map is lambda1+lambda2: NewSphereMachine( "a=(1,10)(2,9)(3,8)(4,7)(5,6)", "b=(1,11)(2,10)(3,9)(4,8)(5,7)", "c=(1,10)(2,9)(3,8)(4,7)(5,6)", "d=(1,9)(2,8)(3,7)(4,6)(10,11)", "a*b*c*d");