local z, r, result;

result := rec();

result.comment := "L2(211) as 212 x 212 monomial matrices over Z(z105)\n";

# Change the value of r to any number between 1 and 52
# to get the complete set of inequivalent faithful irreducible 212-dimensional
# representations of L2(211)
r := 1;
z := E(105)^r;

result.symmetricforms := [ ]; 
result.antisymmetricforms := [ ]; 
result.hermitianforms := [ IdentityMat(212) ];
result.centralizeralgebra := [ IdentityMat(212) ];

result.generators := [
DiagonalMat([z^99,z^37,z^37,z^10,z^103,z^68,z^44,z^61,z^64,z^25,z^47,
  z^76,z^63,z^7,z^51,z^70,z^82,z^92,z^40,z^87,z^49,z^8,z^62,z^43,z^71,
  z^50,z^86,z^34,z^103,z^16,z^62,z^30,z^95,z^104,z^9,z^48,z^27,z^90,
  z^94,z^33,z^68,z^58,z^100,z^69,z^99,z^56,z^65,z^29,z^89,z^84,z^20,
  z^40,1,z^94,z^84,z^18,z^49,z^2,z^88,z^18,z^69,z^32,z^52,z^23,z^41,
  z^91,z^26,z^63,z^15,z^66,z^55,z^42,z^22,z^82,z^32,z^44,z^14,z^96,
  z^29,z^25,z^7,z^30,z^64,z^75,z^101,z^100,z^98,z^72,z^42,z^78,z^80,
  z^23,z^70,z^17,z^8,z^24,z^79,z^53,z^31,z^61,z^54,z^78,z^91,1,z^4,
  z^35,z^10,z^3,z^85,z^93,z^81,z^52,z^6,z^95,z^89,z,z^90,z^28,z^47,
  z^79,z^41,z^19,z^83,z^21,z^83,z^69,z^102,z^74,z^66,z^96,z^5,z^38,
  z^36,z^3,z^48,z^24,z^51,z^12,z^38,z^35,z^85,z^88,z^39,z^4,z^9,z^16,
  z^74,z^57,z^98,z^56,z^72,z^13,z^5,z^104,z^33,z^81,z^77,z^26,z^28,
  z,z^39,z^11,z^34,z^93,z^20,z^21,z^92,z^77,z^46,z^53,z^80,z^46,z^59,
  z^101,z^57,z^97,z^13,z^50,z^17,z^102,z^58,z^73,z^55,z^60,z^75,z^15,
  z^43,z^54,z^45,z^67,z^73,z^97,z^65,z^60,z^45,z^31,z^6,z^12,z^86,
  z^2,z^27,z^76,z^59,z^67,z^14,z^71,z^22,z^19,z^87,z^11,z^36,z^36]) *
PermutationMat(
(  1,197)(  2, 41)(  3,  6)(  4, 33)(  5, 58)(  7,  8)(  9, 65)( 10, 91)
( 11,181)( 12, 48)( 13, 89)( 14,149)( 15,101)( 16,140)( 17, 92)( 18,152)
( 19,193)( 20, 60)( 21,150)( 22,176)( 23, 24)( 25, 28)( 26,183)( 27,208)
( 29,200)( 30,115)( 31,187)( 32,185)( 34,116)( 35, 78)( 36,175)( 37,102)
( 38, 69)( 39,162)( 40,151)( 42,119)( 43,131)( 44,212)( 45,113)( 46, 57)
( 47, 52)( 49,146)( 50,166)( 51,109)( 53,104)( 54,210)( 55,124)( 56,209)
( 59,179)( 61,133)( 62,182)( 63,170)( 64, 74)( 66,205)( 67, 97)( 68, 72)
( 70,161)( 71,178)( 73,123)( 75,191)( 76,100)( 77,103)( 79,202)( 80,171)
( 81, 87)( 82, 84)( 83,121)( 85,105)( 86,153)( 88,155)( 90,201)( 93,106)
( 94,142)( 95,192)( 96,111)( 98,112)( 99,147)(107,114)(108,180)(110,198)
(117,186)(118,168)(120,158)(122,199)(125,207)(126,211)(127,134)(128,196)
(129,143)(130,145)(132,190)(135,148)(136,156)(137,188)(138,164)(139,204)
(141,165)(144,174)(154,160)(157,159)(163,206)(167,177)(169,173)(172,203)
(184,195)(189,194), 212)
,
DiagonalMat([z^77,z^91,z^40,z^21,z^49,z^28,z^64,z^12,z^81,z^99,z^40,
  z^8,z^73,z^82,z^92,z^26,z^5,z^68,z^72,z^11,z^46,z^36,z^78,z^6,z^77,
  z^34,z^43,z^7,z^67,z^62,z^103,z^18,z^83,z^72,z^62,z^101,z^27,z^85,
  z^66,z^101,z^47,z^10,z^30,z,z^19,z^69,z^4,z^41,z^98,z^44,z^33,z^20,
  1,z^60,z^10,z^22,z^97,z^74,z^7,z^3,z^90,z^8,z^42,z^53,z^79,z^78,
  z^76,z^50,z^20,z^56,z^58,z,z^48,z^100,z^91,z^2,z^57,z^31,z^9,z^39,
  z^32,z^56,z^69,z^83,z^87,z^13,z^93,z^86,z^63,z^71,z^59,z^30,z^89,
  z^73,z^67,z^84,z^68,z^6,z^25,z^57,z^19,z^102,z^61,z^104,z^61,z^47,
  z^80,z^52,z^44,z^74,z^88,z^16,z^14,z^86,z^26,z^2,z^29,z^95,z^16,
  z^13,z^63,z^66,z^17,z^87,z^92,z^99,z^52,z^35,z^76,z^34,z^50,z^96,
  z^88,z^82,z^11,z^59,z^55,z^4,z^6,z^84,z^17,z^94,z^12,z^71,z^103,
  z^104,z^70,z^55,z^24,z^31,z^58,z^24,z^37,z^79,z^35,z^75,z^96,z^28,
  z^100,z^80,z^36,z^51,z^33,z^38,z^53,z^98,z^21,z^32,z^23,z^45,z^51,
  z^75,z^43,z^38,z^23,z^9,z^89,z^95,z^64,z^85,z^5,z^54,z^37,z^45,z^97,
  z^49,1,z^102,z^65,z^94,z^14,z^15,z^15,z^93,z^81,z^46,z^22,z^39,z^42,
  z^3,z^25,z^54,z^41,z^90,z^29,z^48,z^60,z^70,z^18,z^65,z^27,z^99]) *
PermutationMat(
(  1, 41, 88)(  2,182,210)(  3,162,191)(  4,136, 99)(  5, 32,174)(  6, 45,151)
(  7,173,145)(  8,184, 73)(  9, 87,161)( 10,170, 39)( 11,195,177)( 12, 21,171)
( 13, 14,148)( 15, 97,131)( 16,121,112)( 17,118,181)( 18, 71,140)( 19,165,180)
( 20, 59,124)( 22,150,164)( 23,201,116)( 24,212,187)( 25, 67, 77)( 26,105, 55)
( 27,146, 89)( 28,115, 34)( 29, 85, 82)( 30,199, 72)( 31,160, 37)( 33, 60,101)
( 35,203, 76)( 36,193,190)( 38,186,129)( 40,198,208)( 42,159, 74)( 43,111,125)
( 44, 53,104)( 46, 95,110)( 47,135,204)( 48, 94,157)( 49,163,154)( 50,144,178)
( 51, 52,127)( 54, 98, 80)( 56,114,188)( 57,202, 91)( 58,130,102)( 61,176,139)
( 62, 84,113)( 63, 65, 93)( 64,134,172)( 66,133,109)( 68,175, 81)( 69,117, 70)
( 75,197,185)( 78,200, 90)( 79,168,179)( 83,143,149)( 86,123,156)( 92,169,108)
( 96,107,196)(100,207,194)(103,141,211)(106,183,167)(119,152,189)(120,137,153)
(122,138,155)(126,132,192)(142,209,166)(158,206,205), 212)];

return result;