local z, r, result;

result := rec();

result.comment := "2.L2(197) as 198 x 198 monomial matrices over Z(z196)\n";

# Change the value of r to any number between 1 and 49
# to get the complete set of inequivalent faithful irreducible 198-dimensional
# representations of 2.L2(197)
r := 1;
z := E(196)^(2*r-1);

result.symmetricforms := [ ]; 
result.antisymmetricforms := [ ]; 
result.hermitianforms := [ IdentityMat(198) ];
result.centralizeralgebra := [ IdentityMat(198) ];

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

return result;