Spracherkennung für: .gi vermutete Sprache: Unknown {[0] [0] [0]} [Methode: Schwerpunktbildung, einfache Gewichte, sechs Dimensionen]
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#W bgnilp.gi Polycyc Bettina Eick
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#F This is a set of nilpotent groups defined by Burde und Grunewald.
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InstallGlobalFunction( BurdeGrunewaldPcpGroup, function( s, t )
local F, k3, k4, k5, k6, k7, k8, k9, k10, k11, G;
F := FromTheLeftCollector( 11 );
k11 := 2*(203230225 - 12930435*s + 677376*s^2 + 4372200*t);
k10 := -2267555 + 151088*s - 126000*t;
k9 := 6*(-1108 - 525*s - 1400*t);
k8 := 4*(79 - 60*s);
k7 := 109;
k6 := -5;
k5 := 2;
k4 := 1;
k3 := -1;
SetConjugate( F, 2, 1, [2,1,3,k3,4,k4,5,k5,6,k6,7,k7,8,k8,9,k9,
10,k10,11,k11] );
k11 := 180*(-5202055 + 135870*s + 18816*s^2 - 190050*t);
k10 := 80*(45515 - 3066*s + 3150*t);
k9 := 35*(829 + 180*s - 360*t);
k8 := 6*(-91 - 60*s);
k7 := 185;
k6 := -4;
k5 := 3;
k4 := -2;
SetConjugate( F, 3, 1, [3,1,4,k4,5,k5,6,k6,7,k7,8,k8,9,k9,
10,k10,11,k11] );
k11 := 3780*(-41975 - 13035*s - 2688*s^2 + 5150*t);
k10 := 6720*(-585 - 28*s - 75*t);
k9 := 840*(-26 - 15*s + 15*t);
k8 := 360*(3 + s);
k7 := -120;
k5 := -6;
SetConjugate( F, 3, 2, [3,1,5,k5,7,k7,8,k8,9,k9,
10,k10,11,k11] );
k11 := 90*(836225 + 60480*s + 28224*s^2 - 222075*t);
k10 := 140*(-2425 - 864*s);
k9 := 16905;
k8 := 15;
k7 := -10;
k6 :=6;
k5 :=-3;
SetConjugate( F, 4, 1, [4,1,5,k5,6,k6,7,k7,8,k8,9,k9,
10,k10,11,k11] );
k11 := 13494600*s;
k10 := 8400*(341 + 60*t);
k9 := 12600*s;
k8 := -900;
k6 := -12;
SetConjugate( F, 4, 2, [4,1,6,k6,8,k8,9,k9,10,k10,11,k11] );
k11 := -85050*(4725 + 334*s);
k10 := -5896800;
k9 := 12600*t;
k8 := 360*s;
k7 := -180;
SetConjugate( F, 4, 3, [4,1,7,k7,8,k8,9,k9,10,k10,11,k11] );
k11 := 21708750;
k10 := -1400;
k9 := 175;
k8 := -20;
k7 := 10;
k6 := -4;
SetConjugate( F, 5, 1, [5,1,6,k6,7,k7,8,k8,9,k9,10,k10,11,k11] );
k11 := 1260*(-12350 + 4032*s^2 - 7725*t);
k10 := 94080*s;
k9 := 840*(13 - 5*t);
k8 := -120*s;
k7 := 40;
SetConjugate( F, 5, 2, [5,1,7,k7,8,k8,9,k9,10,k10,11,k11] );
k11 := 91003500;
k10 := 168000*t;
k9 := 4200*s;
k8 := -360;
SetConjugate( F, 5, 3, [5,1,8,k8,9,k9,10,k10,11,k11] );
k11 := 3780*(-448*s^2 + 3525*t);
k10 := 80640*s;
k9 := -11340 ;
SetConjugate( F, 5, 4, [5,1,9,k9,10,k10,11,k11] );
k11 := -31500;
k10 := 1750;
k9 := -175;
k8 := 15;
k7 := -5;
SetConjugate( F, 6, 1, [6,1,7,k7,8,k8,9,k9,10,k10,11,k11] );
k11 := -6095250*s;
k10 := 42000*(-13 - 2*t);
k9 := -2100*s;
k8 := 150;
SetConjugate( F, 6, 2, [6,1,8,k8,9,k9,10,k10,11,k11] );
k11 := 1890*(448*s^2 - 1525*t);
k10 := 1680*s;
k9 := 2520;
SetConjugate( F, 6, 3, [6,1,9,k9,10,k10,11,k11] );
k11 := 1814400*s;
k10 := -113400;
SetConjugate( F, 6, 4, [6,1,10,k10,11,k11] );
k11 := -10843875;
SetConjugate( F, 6, 5, [6,1,11,k11] );
k11 := 31500;
k10 := -1400;
k9 := 105;
k8 := -6;
SetConjugate( F, 7, 1, [7,1,8,k8,9,k9,10,k10,11,k11] );
k11 := 189*(-6175 - 896*s^2 - 4950*t);
k10 := -17136*s;
k9 := 546;
SetConjugate( F, 7, 2, [7,1,9,k9,10,k10,11,k11] );
k11 := -695520*s;
k10 := 65520;
SetConjugate( F, 7, 3, [7,1,10,k10,11,k11] );
k11 := 4465125;
SetConjugate( F, 7, 4, [7,1,11,k11] );
k11 := -21000;
k10 := 700;
k9 := -35;
SetConjugate( F, 8, 1, [8,1,9,k9,10,k10,11,k11] );
k11 := -141120*s;
k10 := -7280;
SetConjugate( F, 8, 2, [8,1,10,k10,11,k11] );
k11 := -505575;
SetConjugate( F, 8, 3, [8,1,11,k11] );
k11 := 1800;
k10 := -40;
SetConjugate( F, 9, 1, [9,1,10,k10,11,k11] );
k11 := -4275;
SetConjugate( F, 9, 2, [9,1,11,k11] );
k11 := -90;
SetConjugate( F, 10, 1, [10,1,11,k11] );
G := PcpGroupByCollector( F );
return G;
end );
