dLQbcbcdlcn    SFS[D(3,1)(2,1)]
dLQbcbcdlcj    SFS[D(3,1)(2,1)]
dLQbcbcdmcr    SFS[D(2,1)(2,1)]
dLQbcbcducw    SFS[D(2,1)(2,1)]
dLQabccbrwj    SFS[D(3,1)(2,1)]
dLQabccbrwn    SFS[D(3,1)(2,1)]
dLQacbcbgjj    SFS[D(3,1)(3,1)]
dLQacbcbgjn    SFS[D(3,1)(3,2)]
dLQabccbrbr    SFS[D(2,1)(2,1)]
dLQabccbrgw    SFS[D(2,1)(2,1)]
dLQacccjjjr    SFS[D(4,1)(3,1)]
dLQacccjcjj    SFS[D(4,3)(3,1)]
dLQacccjjnj    toroidal 
dLQacccjjbj    toroidal 
dLQacccjngg    toroidal 
dLQacccjsgg    toroidal 
dLQacccjckc    SFS[D(5,2)(2,1)]
dLQacccjffj    SFS[D(4,1)(2,1)]
dLQacccjfkk    SFS[D(5,3)(3,1)]
dLQacccjkwk    SFS[D(5,2)(3,1)]
dLQacccjkkb    SFS[D(5,3)(3,1)]
dLQacccjkks    SFS[D(5,2)(3,1)]
dLQacccjsjk    toroidal 
dLQacccjnjk    toroidal 
dLQacccjgjs    SFS[D(3,1)(2,1)]
dLQacccjsjs    toroidal 
dLQacccjnjs    m006(0,0)
dLQacccjgjb    SFS[D(3,1)(2,1)]
dLQacccjsjb    m011(0,0)
dLQacccjnjb    toroidal 
dLQacccjgbk    toroidal 
dLQacccjsbk    toroidal 
dLQacccjnbk    m019(0,0)
dLQacccjgbs    toroidal 
dLQacccjsbs    SFS[D(5,2)(2,1)]
dLQacccjnbs    m016(0,0)
dLQacccjgbb    toroidal 
dLQacccjsbb    SFS[D(5,2)(2,1)]
dLQacccjnbb    SFS[D(4,1)(2,1)]
dLQacccjgnk    toroidal 
dLQacccjsnk    m016(0,0)
dLQacccjnnk    SFS[D(5,2)(2,1)]
dLQacccjgns    SFS[D(3,1)(2,1)]
dLQacccjgnb    m003(0,0)
dLQacccjsnb    m017(0,0)
dLQacccjnnb    SFS[D(4,1)(2,1)]
dLQacccbjkg     T2xI 
dLQacccbjnr    SFS[D(2,1)(2,1)]
dLQacccbrwb    SFS[D(2,1)(2,1)]
dLQacccbgjs    SFS[D(3,1)(2,1)]
dLQacccbgbk    SFS[D(3,1)(2,1)]
dLQacccbgbs    SFS[D(3,1)(2,1)]
dLQbcccaekv    SFS[D(5,2)(2,1)]
dLQbcccaekj    SFS[D(4,1)(2,1)]
dLQbcccahso    toroidal 
dLQbcccahkv    SFS[D(4,1)(2,1)]
dLQbcccahfj    toroidal 
dLQbcccdxwb    m007(0,0)
dLQbcccdero    m015(0,0)
dLQbcccdegj    m004(0,0)
dLQbcccdhgb    SFS[D(3,1)(3,1)]
dLQbccchhsj    m010(0,0)
dLQbccchhfo    m009(0,0)
dLQbccchegb    SFS[D(3,1)(3,2)]