/*
www-ATLAS of Group Representations.
3.Suz:2 represented as 24 x 24 matrices over GF(2).
*/

F:=GF(2);

x:=CambridgeMatrix(1,F,24,[
"010000000000000000000000",
"100000000000000000000000",
"000100000000000000000000",
"001000000000000000000000",
"000001000000000000000000",
"000010000000000000000000",
"000000001000000000000000",
"000000000100000000000000",
"000000100000000000000000",
"000000010000000000000000",
"000000000000010000000000",
"000000000000001000000000",
"000000000000000010000000",
"000000000010000000000000",
"000000000001000000000000",
"000000000000000000010000",
"000000000000100000000000",
"000000000000000000000100",
"000000000000000000000010",
"000000000000000100000000",
"000000000000000000000001",
"000000000000000001000000",
"000000000000000000100000",
"000000000000000000001000"]);

y:=CambridgeMatrix(1,F,24,[
"001000000000000000000000",
"011000000000000000000000",
"101000000000000000000000",
"000010000000000000000000",
"000000100000000000000000",
"000000010000000000000000",
"000100000000000000000000",
"000000000010000000000000",
"000000000001000000000000",
"000000000000100000000000",
"000001000000000000000000",
"000000000000000100000000",
"000000000000000001000000",
"000000000000000000100000",
"000110010010011000100000",
"000000001000000000000000",
"000000000000000000001000",
"000000000100000000000000",
"000110001000010110001000",
"000111001110110100110000",
"000010101001010000101000",
"001100111111000011001100",
"101101101011000010001010",
"100001001010110101100001"]);

G<x,y>:=MatrixGroup<24,F|x,y>;
print "Group G is 3.Suz:2 < GL(24,GF(2))";