> #Generated 6/29/04 #3-cocycle invariants mod 3 #5 element quandles > for j in L do print(convert(j,matrix)); for i from 1 to 35 do print(Knot,i); print(calc3cocInvar(j,bw[i],3)); od; od; writeto(terminal); print(finished); [0 0 0 0 0] [ ] [1 1 1 1 1] [ ] [2 2 2 4 3] [ ] [3 3 4 3 2] [ ] [4 4 3 2 4] Knot, 1 co3solproccall (t[124] + t[115] + t[118]) 37 + 18 u Knot, 2 25 Knot, 3 25 Knot, 4 25 Knot, 5 55 Knot, 6 25 Knot, 7 25 Knot, 8 25 Knot, 9 25 Knot, 10 25 Knot, 11 (t[124] + t[115] + t[118]) 37 + 18 u Knot, 12 25 Knot, 13 25 Knot, 14 (t[124] + t[115] + t[118]) 37 + 18 u Knot, 15 25 Knot, 16 25 Knot, 17 25 Knot, 18 25 Knot, 19 (2 t[124] + 2 t[115] + 2 t[118]) 37 + 18 u Knot, 20 25 Knot, 21 25 Knot, 22 25 Knot, 23 25 Knot, 24 55 Knot, 25 55 Knot, 26 25 Knot, 27 25 Knot, 28 25 Knot, 29 (2 t[115] + 2 t[118] + 2 t[124]) 37 + 18 u Knot, 30 25 Knot, 31 25 Knot, 32 (t[124] + t[115] + t[118]) (2 t[124] + 2 t[115] + 2 t[118]) 73 + 36 u + 36 u Knot, 33 (2 t[124] + 2 t[115] + 2 t[118]) 37 + 18 u Knot, 34 55 Knot, 35 (2 t[115] + 2 t[118] + 2 t[124]) 37 + 18 u [0 0 1 1 1] [ ] [1 1 0 0 0] [ ] [2 2 2 4 3] [ ] [3 3 4 3 2] [ ] [4 4 3 2 4] Knot, 1 co3solproccall (t[124] + t[115] + t[118]) 37 + 18 u Knot, 2 25 Knot, 3 25 Knot, 4 25 Knot, 5 55 Knot, 6 25 Knot, 7 25 Knot, 8 25 Knot, 9 25 Knot, 10 25 Knot, 11 (t[124] + t[115] + t[118]) 37 + 18 u Knot, 12 25 Knot, 13 25 Knot, 14 (t[124] + t[115] + t[118]) 37 + 18 u Knot, 15 25 Knot, 16 25 Knot, 17 25 Knot, 18 25 Knot, 19 (2 t[124] + 2 t[115] + 2 t[118]) 37 + 18 u Knot, 20 25 Knot, 21 25 Knot, 22 25 Knot, 23 25 Knot, 24 55 Knot, 25 55 Knot, 26 25 Knot, 27 25 Knot, 28 25 Knot, 29 (2 t[115] + 2 t[118] + 2 t[124]) 37 + 18 u Knot, 30 25 Knot, 31 25 Knot, 32 (t[124] + t[115] + t[118]) (2 t[124] + 2 t[115] + 2 t[118]) 73 + 36 u + 36 u Knot, 33 (2 t[124] + 2 t[115] + 2 t[118]) 37 + 18 u Knot, 34 55 Knot, 35 (2 t[115] + 2 t[118] + 2 t[124]) 37 + 18 u [0 0 0 0 0] [ ] [1 1 1 2 2] [ ] [2 2 2 1 1] [ ] [3 4 4 3 3] [ ] [4 3 3 4 4] Knot, 1 co3solproccall 25 Knot, 2 25 Knot, 3 25 Knot, 4 25 Knot, 5 25 Knot, 6 25 Knot, 7 25 Knot, 8 25 Knot, 9 25 Knot, 10 25 Knot, 11 25 Knot, 12 25 Knot, 13 25 Knot, 14 25 Knot, 15 25 Knot, 16 25 Knot, 17 25 Knot, 18 25 Knot, 19 25 Knot, 20 25 Knot, 21 25 Knot, 22 25 Knot, 23 25 Knot, 24 25 Knot, 25 25 Knot, 26 25 Knot, 27 25 Knot, 28 25 Knot, 29 25 Knot, 30 25 Knot, 31 25 Knot, 32 25 Knot, 33 25 Knot, 34 25 Knot, 35 25 [0 0 0 0 0] [ ] [1 1 4 2 3] [ ] [2 3 2 4 1] [ ] [3 4 1 3 2] [ ] [4 2 3 1 4] Knot, 1 co3solproccall 85 Knot, 2 85 Knot, 3 25 Knot, 4 25 Knot, 5 25 Knot, 6 25 Knot, 7 25 Knot, 8 25 Knot, 9 85 Knot, 10 85 Knot, 11 25 Knot, 12 25 Knot, 13 25 Knot, 14 25 Knot, 15 85 Knot, 16 25 Knot, 17 25 Knot, 18 85 Knot, 19 85 Knot, 20 25 Knot, 21 25 Knot, 22 25 Knot, 23 25 Knot, 24 85 Knot, 25 85 Knot, 26 25 Knot, 27 85 Knot, 28 25 Knot, 29 85 Knot, 30 25 Knot, 31 25 Knot, 32 325 Knot, 33 85 Knot, 34 85 Knot, 35 85 [0 0 1 1 1] [ ] [1 1 0 0 0] [ ] [3 4 2 4 3] [ ] [4 2 4 3 2] [ ] [2 3 3 2 4] Knot, 1 co3solproccall 55 Knot, 2 25 Knot, 3 25 Knot, 4 25 Knot, 5 55 Knot, 6 25 Knot, 7 25 Knot, 8 25 Knot, 9 25 Knot, 10 25 Knot, 11 55 Knot, 12 25 Knot, 13 25 Knot, 14 55 Knot, 15 25 Knot, 16 25 Knot, 17 25 Knot, 18 25 Knot, 19 55 Knot, 20 25 Knot, 21 25 Knot, 22 25 Knot, 23 25 Knot, 24 55 Knot, 25 55 Knot, 26 25 Knot, 27 25 Knot, 28 25 Knot, 29 55 Knot, 30 25 Knot, 31 25 Knot, 32 145 Knot, 33 55 Knot, 34 55 Knot, 35 55 [0 3 4 2 1] [ ] [2 1 3 4 0] [ ] [1 4 2 0 3] [ ] [4 0 1 3 2] [ ] [3 2 0 1 4] Knot, 1 co3solproccall 25 Knot, 2 125 Knot, 3 125 Knot, 4 25 Knot, 5 25 Knot, 6 25 Knot, 7 25 Knot, 8 25 Knot, 9 25 Knot, 10 25 Knot, 11 125 Knot, 12 25 Knot, 13 25 Knot, 14 25 Knot, 15 25 Knot, 16 25 Knot, 17 25 Knot, 18 25 Knot, 19 25 Knot, 20 25 Knot, 21 25 Knot, 22 125 Knot, 23 125 Knot, 24 25 Knot, 25 25 Knot, 26 25 Knot, 27 25 Knot, 28 25 Knot, 29 25 Knot, 30 125 Knot, 31 25 Knot, 32 125 Knot, 33 25 Knot, 34 25 Knot, 35 125