#
# This file contains the classification by Lee & Vaughan-Lee.
#
# This file is GAP code which in conjunction with the GAP package
# LiePRing provides a database of the nilpotent Lie rings of order
# p^8 with maximal nilpotency class 7 for p >= 5.
# The code creates a list p8maxclassrings of 69 LiePRings. For a
# prime p >= 5, each LiePRing L in this list defines a family of
# nilpotent Lie rings of order p^8 with nilpotency class 7.
# The function LiePRingsInFamilyP8MC(L,p) returns this family.
# For any given prime p >= 5 the 69 families of lie rings of order
# p^8 provide a complete and irredundant list of the nilpotent Lie
# rings of order p^8 with maximal class.
LIE_DATA_MC8 := [
[8,2,7,"<a,b|bab,baaab,pa,pb,baaaaab,class=7>",[[],[3,1],[],[4,1],[],[],[5,1],[],[ ],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],,,"p8maxclass1"],
[8,2,7,"<a,b|bab,baaab,pa-baaaaaa,pb,baaaaab,class=7>",[[8,1],[3,1],[],[4,1],[],[],[5,1],[],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],,,"p8maxclass2"],
[8,2,7,"<a,b|bab,baaab,pa,pb-xbaaaaaa,baaaaab,class=7>",[[],[3,1],[8,x],[4,1],[],[],[5,1],[],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0, x~xa^6",,"p8maxclass3"],
[8,2,7,"<a,b|bab,baaab-baaaaaa,pa,pb,baaaaab,class=7>",[[],[3,1],[],[4,1],[],[],[5,1],[],[8,-1],[],[6,1],[8,1],[],[],[],[7,1],[],[],[],[],[],[8,1]],,,"p8maxclass4"],
[8,2,7,"<a,b|bab,baaab-baaaaaa,pa-xbaaaaaa,pb,baaaaab,class=7>",[[8,x],[3,1],[],[4,1],[],[],[5,1],[],[8,-1],[],[6,1],[8,1],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0, x~xa^8",,"p8maxclass5"],
[8,2,7,"<a,b|bab,baaab-baaaaaa,pa,pb-xbaaaaaa,baaaaab,class=7>",[[],[3,1],[8,x],[4,1],[],[],[5,1],[],[8,-1],[],[6,1],[8,1],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0, x~xa^6",,"p8maxclass6"],
[8,2,7,"<a,b|bab-baaaaaa,baaab,pa,pb,baaaaab,class=7>",[[],[3,1],[],[4,1],[8,1],[],[5,1],[],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],,,"p8maxclass7"],
[8,2,7,"<a,b|bab-baaaaaa,baaab,pa-xbaaaaaa,pb,baaaaab,class=7>",[[8,x],[3,1],[],[4,1],[8,1],[],[5,1],[],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0, x~xa^10",,"p8maxclass8"],
[8,2,7,"<a,b|bab-baaaaaa,baaab,pa,pb-xbaaaaaa,baaaaab,class=7>",[[],[3,1],[8,x],[4,1],[8,1],[],[5,1],[],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0, x~xa^6",,"p8maxclass9"],
[8,2,7,"<a,b|bab,baaab,pa,pb,baaaaaa,class=7>",[[],[3,1],[],[4,1],[],[],[5,1],[],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],,,"p8maxclass10"],
[8,2,7,"<a,b|bab,baaab,pa-baaaaab,pb,baaaaaa,class=7>",[[8,1],[3,1],[],[4,1],[],[],[5,1],[],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],,,"p8maxclass11"],
[8,2,7,"<a,b|bab,baaab,pa-wbaaaaab,pb,baaaaaa,class=7>",[[8,w],[3,1],[],[4,1],[],[],[5,1],[],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],,,"p8maxclass12"],
[8,2,7,"<a,b|bab,baaab,pa,pb-baaaaab,baaaaaa,class=7>",[[],[3,1],[8,1],[4,1],[],[],[5,1],[],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],,,"p8maxclass13"],
[8,2,7,"<a,b|bab,baaab,pa-xbaaaaab,pb-baaaaab,baaaaaa,class=7>",[[8,x],[3,1],[8,1],[4,1],[],[],[5,1],[],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x ne 0, x~xa^6",,"p8maxclass14"],
[8,2,7,"<a,b|bab,baaab-baaaaa,pa,pb,class=7>",[[],[3,1],[],[4,1],[],[],[5,1],[],[7,-1],[],[6,1],[7,1],[8,-1],[],[],[7,1],[8,2],[],[],[],[],[8,1]],,,"p8maxclass15"],
[8,2,7,"<a,b|bab,baaab-baaaaa,pa-xbaaaaaa,pb,class=7>",[[8,x],[3,1],[],[4,1],[],[],[5,1],[],[7,-1],[],[6,1],[7,1],[8,-1],[],[],[7,1],[8,2],[],[],[],[],[8,1]],"x ne 0, x~xa^7",,"p8maxclass16"],
[8,2,7,"<a,b|bab,baaab-baaaaa,pa,pb-xbaaaaaa,class=7>",[[],[3,1],[8,x],[4,1],[],[],[5,1],[],[7,-1],[],[6,1],[7,1],[8,-1],[],[],[7,1],[8,2],[],[],[],[],[8,1]],"x ne 0, x~xa^6",,"p8maxclass17"],
[8,2,7,"<a,b|bab,baaab-baaaaa,pa-xbaaaaaa,pb-ybaaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[],[],[5,1],[],[7,-1],[],[6,1],[7,1],[8,-1],[],[],[7,1],[8,2],[],[],[],[],[8,1]],"x,y ne 0, [x,y]~[xa^7,ya^6]",,"p8maxclass18"],
[8,2,7,"<a,b|bab-baaaaa,baaab,pa,pb,baaaaab,class=7>",[[],[3,1],[],[4,1],[7,1],[],[5,1],[8,1],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],,,"p8maxclass19"],
[8,2,7,"<a,b|bab-baaaaa,baaab,pa,pb-xbaaaaaa,baaaaab,class=7>",[[],[3,1],[8,x],[4,1],[7,1],[],[5,1],[8,1],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0, x~xa^6",,"p8maxclass20"],
[8,2,7,"<a,b|bab-baaaaa,baaab,pa-xbaaaaaa,pb,baaaaab,class=7>",[[8,x],[3,1],[],[4,1],[7,1],[],[5,1],[8,1],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0, x~xa^9",,"p8maxclass21"],
[8,2,7,"<a,b|bab-baaaaa-baaaaaa,baaab,pa,pb,baaaaab,class=7>",[[],[3,1],[],[4,1],[7,1,8,1],[],[5,1],[8,1],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],,,"p8maxclass22"],
[8,2,7,"<a,b|bab-baaaaa-baaaaaa,baaab,pa-xbaaaaaa,pb,baaaaab,class=7>",[[8,x],[3,1],[],[4,1],[7,1,8,1],[],[5,1],[8,1],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0",,"p8maxclass23"],
[8,2,7,"<a,b|bab-baaaaa-baaaaaa,baaab,pa,pb-xbaaaaaa,baaaaab,class=7>",[[],[3,1],[8,x],[4,1],[7,1,8,1],[],[5,1],[8,1],[],[],[6,1],[],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0",,"p8maxclass24"],
[8,2,7,"<a,b|bab-baaaaa,baaab-baaaaaa,pa,pb,baaaaab,class=7>",[[],[3,1],[],[4,1],[7,1],[],[5,1],[8,1],[8,-1],[],[6,1],[8,1],[],[],[],[7,1],[],[],[],[],[],[8,1]],,,"p8maxclass25"],
[8,2,7,"<a,b|bab-baaaaa,baaab-baaaaaa,pa-xbaaaaaa,pb,baaaaab,class=7>",[[8,x],[3,1],[],[4,1],[7,1],[],[5,1],[8,1],[8,-1],[],[6,1],[8,1],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0",,"p8maxclass26"],
[8,2,7,"<a,b|bab-baaaaa,baaab-baaaaaa,pa,pb-xbaaaaaa,baaaaab,class=7>",[[],[3,1],[8,x],[4,1],[7,1],[],[5,1],[8,1],[8,-1],[],[6,1],[8,1],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 0",,"p8maxclass27"],
[8,2,7,"<a,b|bab-baaaaa,baaab,pa,pb,baaaaaa,class=7>",[[],[3,1],[],[4,1],[7,1],[],[5,1],[],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],,,"p8maxclass28"],
[8,2,7,"<a,b|bab-baaaaa,baaab,pa-xbaaaaab,pb,baaaaaa,class=7>",[[8,x],[3,1],[],[4,1],[7,1],[],[5,1],[],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x ne 0, x~xa^12",,"p8maxclass29"],
[8,2,7,"<a,b|bab-baaaaa,baaab,pa,pb-xbaaaaab,baaaaaa,class=7>",[[],[3,1],[8,x],[4,1],[7,1],[],[5,1],[],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x ne 0, x~xa^9",,"p8maxclass30"],
[8,2,7,"<a,b|bab-baaaaa,baaab,pa-xbaaaaab,pb-ybaaaaab,baaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[7,1],[],[5,1],[],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x,y ne 0, [x,y]~[xa^12,ya^9]",,"p8maxclass31"],
[8,2,7,"<a,b|bab-baaaa,baaab-xbaaaaaa,pa,pb,baaaaab,class=7>",[[],[3,1],[],[4,1],[6,1],[],[5,1],[7,1],[8,-x + 1],[],[6,1],[8,x],[],[],[],[7,1],[],[],[],[],[],[8,1]],,,"p8maxclass32"],
[8,2,7,"<a,b|bab-baaaa,baaab-xbaaaaaa,pa-ybaaaaaa,pb,baaaaab,class=7>",[[8,y],[3,1],[],[4,1],[6,1],[],[5,1],[7,1],[8,-x + 1],[],[6,1],[8,x],[],[],[],[7,1],[],[],[],[],[],[8,1]],"y ne 0, [x,y]~[x,ya^8]",,"p8maxclass33"],
[8,2,7,"<a,b|bab-baaaa,baaab-xbaaaaaa,pa,pb-ybaaaaaa,baaaaab,class=7>",[[],[3,1],[8,y],[4,1],[6,1],[],[5,1],[7,1],[8,-x + 1],[],[6,1],[8,x],[],[],[],[7,1],[],[],[],[],[],[8,1]],"y ne 0, [x,y]~[x,ya^6]",,"p8maxclass34"],
[8,2,7,"<a,b|bab-baaaa,baaab-baaaaaa,pa-xbaaaaaa,pb-ybaaaaaa,baaaaab,class=7>",[[8,x],[3,1],[8,y],[4,1],[6,1],[],[5,1],[7,1],[],[],[6,1],[8,1],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x,y ne 0, [x,y]~[xa^8,ya^6]",,"p8maxclass35"],
[8,2,7,"<a,b|bab-baaaa,baaab,pa,pb,baaaaaa,class=7>",[[],[3,1],[],[4,1],[6,1],[],[5,1],[7,1],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],,,"p8maxclass36"],
[8,2,7,"<a,b|bab-baaaa,baaab,pa-xbaaaaab,pb,baaaaaa,class=7>",[[8,x],[3,1],[],[4,1],[6,1],[],[5,1],[7,1],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x ne 0, x~xa^10",,"p8maxclass37"],
[8,2,7,"<a,b|bab-baaaa,baaab,pa,pb-xbaaaaab,baaaaaa,class=7>",[[],[3,1],[8,x],[4,1],[6,1],[],[5,1],[7,1],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x ne 0, x~xa^8",,"p8maxclass38"],
[8,2,7,"<a,b|bab-baaaa,baaab,pa-xbaaaaab,pb-ybaaaaab,baaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[6,1],[],[5,1],[7,1],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x,y ne 0, [x,y]~[xa^10,ya^8]",,"p8maxclass39"],
[8,2,7,"<a,b|bab-baaaa,baaab-baaaaa,pa-xbaaaaaa,pb-ybaaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[6,1],[],[5,1],[7,1],[7,-1,8,1],[],[6,1],[7,1],[8,-1],[],[],[7,1],[8,2],[],[],[],[],[8,1]],,,"p8maxclass40"],
[8,2,7,"<a,b|bab-baaaa-baaaaa,baaab-xbaaaaaa,pa,pb,baaaaab,class=7>",[[],[3,1],[],[4,1],[6,1,7,1],[],[5,1],[7,1,8,1],[8,-x + 1],[],[6,1],[8,x],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 1",,"p8maxclass41"],
[8,2,7,"<a,b|bab-baaaa-baaaaa,baaab-xbaaaaaa,pa-ybaaaaaa,pb,baaaaab,class=7>",[[8,y],[3,1],[],[4,1],[6,1,7,1],[],[5,1],[7,1,8,1],[8,-x + 1],[],[6,1],[8,x],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 1, y ne 0",,"p8maxclass42"],
[8,2,7,"<a,b|bab-baaaa-baaaaa,baaab-xbaaaaaa,pa,pb-ybaaaaaa,baaaaab,class=7>",[[],[3,1],[8,y],[4,1],[6,1,7,1],[],[5,1],[7,1,8,1],[8,-x + 1],[],[6,1],[8,x],[],[],[],[7,1],[],[],[],[],[],[8,1]],"x ne 1, y ne 0",,"p8maxclass43"],
[8,2,7,"<a,b|bab-baaaa-baaaaa,baaab-baaaaaa,pa-xbaaaaaa,pb-ybaaaaaa,baaaaab,class=7>",[[8,x],[3,1],[8,y],[4,1],[6,1,7,1],[],[5,1],[7,1,8,1],[],[],[6,1],[8,1],[],[],[],[7,1],[],[],[],[],[],[8,1]],,,"p8maxclass44"],
[8,2,7,"<a,b|bab-baaaa-baaaaa,baaab,pa-xbaaaaab,pb-ybaaaaab,baaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[6,1,7,1],[],[5,1],[7,1],[],[],[6,1],[],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],,,"p8maxclass45"],
[8,2,7,"<a,b|bab-baaa,baaab-baaaaa,baaaaab,pa,pb,class=7>",[[],[3,1],[],[4,1],[5,1],[],[5,1],[6,1],[],[],[6,1],[7,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],,,"p8maxclass46"],
[8,2,7,"<a,b|bab-baaa,baaab-baaaaa,baaaaab,pa-xbaaaaaa,pb,class=7>",[[8,x],[3,1],[],[4,1],[5,1],[],[5,1],[6,1],[],[],[6,1],[7,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"x ne 0, x~xa^7",,"p8maxclass47"],
[8,2,7,"<a,b|bab-baaa,baaab-baaaaa,baaaaab,pa,pb-xbaaaaaa,class=7>",[[],[3,1],[8,x],[4,1],[5,1],[],[5,1],[6,1],[],[],[6,1],[7,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"x ne 0, x~xa^6",,"p8maxclass48"],
[8,2,7,"<a,b|bab-baaa,baaab-baaaaa,baaaaab,pa-xbaaaaaa,pb-ybaaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[5,1],[],[5,1],[6,1],[],[],[6,1],[7,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"x,y ne 0, [x,y]~[xa^7,ya^6]",,"p8maxclass49"],
[8,2,7,"<a,b|bab-baaa,baaab-baaaaa-baaaaaa,baaaaab,pa-xbaaaaaa,pb-ybaaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[5,1],[],[5,1],[6,1],[8,-1],[],[6,1],[7,1,8,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],,,"p8maxclass50"],
[8,2,7,"<a,b|bab-baaa-xbaaaaaa,baaab-baaaaa,baaaaab,pa-ybaaaaaa,pb-zbaaaaaa,class=7>",[[8,y],[3,1],[8,z],[4,1],[5,1,8,x],[],[5,1],[6,1],[],[],[6,1],[7,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"x ne 0, [x,y,z]~[xa^3,ya^7,za^6]",,"p8maxclass51"],
[8,2,7,"<a,b|bab-baaa,baaab-xbaaaaa,pa,pb,baaaaab,class=7>",[[],[3,1],[],[4,1],[5,1],[],[5,1],[6,1],[7,-x + 1],[],[6,1],[7,x],[8,-x + 1],[],[],[7,1],[8,2*x - 1],[],[],[],[],[8,1]],"x ne 1",,"p8maxclass52"],
[8,2,7,"<a,b|bab-baaa,baaab-xbaaaaa,pa-ybaaaaaa,pb,baaaaab,class=7>",[[8,y],[3,1],[],[4,1],[5,1],[],[5,1],[6,1],[7,-x + 1],[],[6,1],[7,x],[8,-x + 1],[],[],[7,1],[8,2*x - 1],[],[],[],[],[8,1]],"x ne 1, y ne 0, [x,y]~[x,ya^7]",,"p8maxclass53"],
[8,2,7,"<a,b|bab-baaa,baaab-xbaaaaa,pa,pb-ybaaaaaa,baaaaab,class=7>",[[],[3,1],[8,y],[4,1],[5,1],[],[5,1],[6,1],[7,-x + 1],[],[6,1],[7,x],[8,-x + 1],[],[],[7,1],[8,2*x - 1],[],[],[],[],[8,1]],"x ne 1, y ne 0, [x,y]~[x,ya^6]",,"p8maxclass54"],
[8,2,7,"<a,b|bab-baaa,baaab-xbaaaaa,pa-ybaaaaaa,pb-zbaaaaaa,baaaaab,class=7>",[[8,y],[3,1],[8,z],[4,1],[5,1],[],[5,1],[6,1],[7,-x + 1],[],[6,1],[7,x],[8,-x + 1],[],[],[7,1],[8,2*x - 1],[],[],[],[],[8,1]],"x ne 1, y,z ne 0, [x,y,z]~[x,ya^7,za^6]",,"p8maxclass55"],
[8,2,7,"<a,b|bab-baaa,baaab-xbaaaaa-baaaaaa,pa-ybaaaaaa,pb-zbaaaaaa,baaaaab,class=7>",[[8,y],[3,1],[8,z],[4,1],[5,1],[],[5,1],[6,1],[7,-x + 1,8,-1],[],[6,1],[7,x,8,1],[8,-x + 1],[],[],[7,1],[8,2*x - 1],[],[],[],[],[8,1]],"x ne 1, all y,z",,"p8maxclass56"],
[8,2,7,"<a,b|bab-baaa,baaab-3baaaaa,pa,pb,baaaaaa,class=7>",[[],[3,1],[],[4,1],[5,1],[],[5,1],[6,1],[7,-2],[],[6,1],[7,3],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],,,"p8maxclass57"],
[8,2,7,"<a,b|bab-baaa,baaab-3baaaaa,pa-xbaaaaab,pb,baaaaaa,class=7>",[[8,x],[3,1],[],[4,1],[5,1],[],[5,1],[6,1],[7,-2],[],[6,1],[7,3],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x ne 0, x~xa^8",,"p8maxclass58"],
[8,2,7,"<a,b|bab-baaa,baaab-3baaaaa,pa,pb-xbaaaaab,baaaaaa,class=7>",[[],[3,1],[8,x],[4,1],[5,1],[],[5,1],[6,1],[7,-2],[],[6,1],[7,3],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x ne 0, x~xa^7",,"p8maxclass59"],
[8,2,7,"<a,b|bab-baaa,baaab-3baaaaa,pa-xbaaaaab,pb-ybaaaaab,baaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[5,1],[],[5,1],[6,1],[7,-2],[],[6,1],[7,3],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"x,y ne 0, [x,y]~[xa^8,ya^7]",,"p8maxclass60"],
[8,2,7,"<a,b|bab-baaa,baaab-3baaaaa-baaaaab,pa-xbaaaaab,pb-ybaaaaab,baaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[5,1],[],[5,1],[6,1],[7,-2,8,-1],[],[6,1],[7,3,8,1],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"[x,y]~[x,-y]",,"p8maxclass61"],
[8,2,7,"<a,b|bab-baaa,baaab-3baaaaa-wbaaaaab,pa-xbaaaaab,pb-ybaaaaab,baaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[5,1],[],[5,1],[6,1],[7,-2,8,-w],[],[6,1],[7,3,8,w],[],[8,1],[],[7,1],[],[8,-1],[],[],[],[],[8,1]],"[x,y]~[x,-y]",,"p8maxclass62"],
[8,2,7,"<a,b|bab-baaa,baaab-3baaaaa-xbaaaaaa,pa-ybaaaaaa,pb-zbaaaaaa,baaaaab-baaaaaa,class=7>",[[8,y],[3,1],[8,z],[4,1],[5,1],[],[5,1],[6,1],[7,-2,8,-x],[],[6,1],[7,3,8,x],[8,-2],[8,1],[],[7,1],[8,5],[8,-1],[],[],[],[8,1],[8,1]],,,"p8maxclass63"],
[8,2,7,"<a,b|bab-baaa-baaaaa,baaab-baaaaa,baaaaab,pa-xbaaaaaa,pb-ybaaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[5,1,7,1],[],[5,1],[6,1,8,1],[],[],[6,1],[7,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"[x,y]~[-x,y]",,"p8maxclass64"],
[8,2,7,"<a,b|bab-baaa-baaaaa-xbaaaaaa,baaab-baaaaa,baaaaab,pa-ybaaaaaa,pb-zbaaaaaa,class=7>",[[8,y],[3,1],[8,z],[4,1],[5,1,7,1,8,x],[],[5,1],[6,1,8,1],[],[],[6,1],[7,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"x ne 0, [x,y,z]~[-x,y,z]",,"p8maxclass65"],
[8,2,7,"<a,b|bab-baaa-baaaaa,baaab-baaaaa-xbaaaaaa,baaaaab,pa-ybaaaaaa,pb-zbaaaaaa,class=7>",[[8,y],[3,1],[8,z],[4,1],[5,1,7,1],[],[5,1],[6,1,8,1],[8,-x],[],[6,1],[7,1,8,x],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"x ne 0, [x,y,z]~[-x,y,z]",,"p8maxclass66"],
[8,2,7,"<a,b|bab-baaa-wbaaaaa,baaab-baaaaa,baaaaab,pa-xbaaaaaa,pb-ybaaaaaa,class=7>",[[8,x],[3,1],[8,y],[4,1],[5,1,7,w],[],[5,1],[6,1,8,w],[],[],[6,1],[7,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"[x,y]~[-x,y]",,"p8maxclass67"],
[8,2,7,"<a,b|bab-baaa-wbaaaaa-xbaaaaaa,baaab-baaaaa,baaaaab,pa-ybaaaaaa,pb-zbaaaaaa,class=7>",[[8,y],[3,1],[8,z],[4,1],[5,1,7,w,8,x],[],[5,1],[6,1,8,w],[],[],[6,1],[7,1],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"x ne 0, [x,y,z]~[-x,y,z]",,"p8maxclass68"],
[8,2,7,"<a,b|bab-baaa-wbaaaaa,baaab-baaaaa-xbaaaaaa,baaaaab,pa-ybaaaaaa,pb-zbaaaaaa,class=7>",[[8,y],[3,1],[8,z],[4,1],[5,1,7,w],[],[5,1],[6,1,8,w],[8,-x],[],[6,1],[7,1,8,x],[],[],[],[7,1],[8,1],[],[],[],[],[8,1]],"x ne 0, [x,y,z]~[-x,y,z]",,"p8maxclass69"]];
InstallGlobalFunction( LiePRingsByLibraryMC8, function()
return List(LIE_DATA_MC8, x -> LiePRingByData(8,x));
end);
BindGlobal( "LiePRingsInFamilyMC8", function( L, P )
local W, p, w, d, c, l, para, vals, X, Y, Z,
x, y, z, t, j, k, m, n, r, s, u, v;
# get data
W := PrimitiveRootMod(P);
p := PrimeOfLiePRing(L);
w := IndeterminateByName("w");
d := DimensionOfLiePRing(L);
c := LibraryConditions(L)[1];
l := LibraryName(L);
para := ParametersOfLiePRing(L);
vals := [];
# check
if IsInt(p) then return fail; fi;
if not IsInt(P) then return fail; fi;
if P < 5 then return fail; fi;
# the 0-parameters case
if Length(para) = 0 then
return TranslatedLiePRings( L, P, [], [[]], false );
fi;
# the case of trivial conditions
if Length(c) = 0 then
vals := Tuples([0..P-1], Length(para));
return TranslatedLiePRings( L, P, para, vals, false );
fi;
# assign variable names
x := IndeterminateByName("x");
y := IndeterminateByName("y");
z := IndeterminateByName("z");
# 1 parameter
if Length(para) = 1 then
# LiePRings Case 3, 6, 9, 14, 17, 20, 48
if c = "x ne 0, x~xa^6" then
vals := List([0..Gcd(P-1,6)-1], X -> [(W^X) mod P]);
# Case 16, 47, 59
elif c = "x ne 0, x~xa^7" then
vals := List([0..Gcd(P-1,7)-1], X -> [(W^X) mod P]);
# Case 5, 38, 58
elif c = "x ne 0, x~xa^8" then
vals := List([0..Gcd(P-1,8)-1], X -> [(W^X) mod P]);
# Case 21, 30
elif c = "x ne 0, x~xa^9" then
vals := List([0..Gcd(P-1,9)-1], X -> [(W^X) mod P]);
# Case 8, 37
elif c = "x ne 0, x~xa^10" then
vals := List([0..Gcd(P-1,10)-1], X -> [(W^X) mod P]);
# Case 29
elif c = "x ne 0, x~xa^12" then
vals := List([0..Gcd(P-1,12)-1], X -> [(W^X) mod P]);
# Case 23, 24, 26, 27
elif c = "x ne 0" then
vals := List([1..P-1], X -> [X]);
# Case 41, 52
elif c = "x ne 1" then
vals := List(Difference([0..P-1], [1]), X -> [X]);
fi;
if P>3 and vals = [] then Error("conditions not found - para 1"); fi;
return TranslatedLiePRings( L, P, para, vals, false );
fi;
# 2 parameter
if Length(para) = 2 then
# Case 64, 67
if c = "[x,y]~[-x,y]" then
vals := Cartesian([0..(P-1)/2], [0..(P-1)]);
# Case 61, 62
elif c = "[x,y]~[x,-y]" then
vals := Cartesian([0..(P-1)], [0..(P-1)/2]);
# Case 42, 43
elif c = "x ne 1, y ne 0" then
vals := Cartesian( Difference([0..(P-1)], [1]), [1..(P-1)]);
# Case 54
elif c = "x ne 1, y ne 0, [x,y]~[x,ya^6]" then
vals := Cartesian(Difference([0..(P-1)],[1]),
List([0..Gcd(P-1,6)-1], X -> ((W^X) mod P)));
# Case 53
elif c = "x ne 1, y ne 0, [x,y]~[x,ya^7]" then
vals := Cartesian(Difference([0..(P-1)],[1]),
List([0..Gcd(P-1,7)-1], X -> ((W^X) mod P)));
# Case 18, 49
elif c = "x,y ne 0, [x,y]~[xa^7,ya^6]" then
vals := List([0..(Gcd(P-1,6)-1)], X -> ((W^X) mod P));
vals := Cartesian(ValsFunction5(P,6,1), vals);
# Case 35
elif c = "x,y ne 0, [x,y]~[xa^8,ya^6]" then
vals := List([0..(Gcd(P-1,6)-1)], X -> ((W^X) mod P));
vals := Cartesian(ValsFunction5(P,3,1), vals);
# Case 60
elif c = "x,y ne 0, [x,y]~[xa^8,ya^7]" then
vals := List([0..(Gcd(P-1,7)-1)], X -> ((W^X) mod P));
vals := Cartesian(ValsFunction5(P,7,1), vals);
# Case 39
elif c = "x,y ne 0, [x,y]~[xa^10,ya^8]" then
vals := List([0..(Gcd(P-1,10)-1)], X -> ((W^X) mod P));
vals := Cartesian(vals, ValsFunction5(P,5,1));
# Case 31
elif c = "x,y ne 0, [x,y]~[xa^12,ya^9]" then
vals := List([0..(Gcd(P-1,12)-1)], X -> ((W^X) mod P));
vals := Cartesian(vals, ValsFunction5(P,4,1));
# Case 34
elif c = "y ne 0, [x,y]~[x,ya^6]" then
vals := Cartesian([0..(P-1)],
List([0..Gcd(P-1,6)-1], X -> ((W^X) mod P)));
# Case 33
elif c = "y ne 0, [x,y]~[x,ya^8]" then
vals := Cartesian([0..(P-1)],
List([0..Gcd(P-1,8)-1], X -> ((W^X) mod P)));
fi;
if P>3 and vals = [] then Error("conditions not found - para 2"); fi;
return TranslatedLiePRings( L, P, para, vals, false );
fi;
# 3 parameter
if Length(para) = 3 then
# Case 56
if c = "x ne 1, all y,z" then
vals := Cartesian(Difference([0..(P-1)],[1]),[0..(P-1)],[0..(P-1)]);
# Case 65, 66, 68, 69
elif c = "x ne 0, [x,y,z]~[-x,y,z]" then
vals := Cartesian([1..(P-1)/2], [0..(P-1)], [0..(P-1)]);
# Case 51
elif c = "x ne 0, [x,y,z]~[xa^3,ya^7,za^6]" then
vals := List([0..Gcd(P-1,3)-1], X -> ((W^X) mod P));
vals := Cartesian(vals, ValsFunction5(P,3,0), [0..(P-1)]);
# Case 55
elif c = "x ne 1, y,z ne 0, [x,y,z]~[x,ya^7,za^6]" then
vals := List([0..(2*Gcd(P-1,3)-1)], X -> ((W^X) mod P));
vals := Cartesian(Difference([0..(P-1)],[1]),
ValsFunction5(P,6,1), vals);
fi;
if P>3 and vals = [] then Error("conditions not found - para 3"); fi;
return TranslatedLiePRings( L, P, para, vals, false );
fi;
end );
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