let i, j, k be Nat; :: thesis:
let f be constant standard special_circular_sequence; :: thesis:
assume that
A1: 1 <= i and
A2: i + 1 <= len (GoB f) and
A3: 1 <= j and
A4: j + 1 <= width (GoB f) and
A5: 1 <= k and
A6: k + 1 < len f and
A7: LSeg (((GoB f) * ((i + 1),j)),((GoB f) * ((i + 1),(j + 1)))) = LSeg (f,k) and
A8: LSeg (((GoB f) * (i,j)),((GoB f) * ((i + 1),j))) = LSeg (f,(k + 1)) ; :: thesis:
A9: i < len (GoB f) by A2, NAT_1:13;
A10: i < i + 1 by NAT_1:13;
A11: 1 <= j + 1 by NAT_1:11;
j < width (GoB f) by A4, NAT_1:13;
then ((GoB f) * (i,j)) `1 = ((GoB f) * (i,1)) `1 by A1, A3, A9, GOBOARD5:2
.= ((GoB f) * (i,(j + 1))) `1 by A1, A4, A11, A9, GOBOARD5:2 ;
then A12: (GoB f) * (i,j) <> (GoB f) * ((i + 1),(j + 1)) by A1, A2, A4, A11, A10, GOBOARD5:3;
A13: 1 <= k + 1 by NAT_1:11;
A14: k + (1 + 1) = (k + 1) + 1 ;
then k + 2 <= len f by A6, NAT_1:13;
then A15: LSeg (((GoB f) * (i,j)),((GoB f) * ((i + 1),j))) = LSeg ((f /. (k + 1)),(f /. (k + 2))) by A8, A14, A13, TOPREAL1:def 3;
then A16: ( ( (GoB f) * (i,j) = f /. (k + 2) & (GoB f) * ((i + 1),j) = f /. (k + 1) ) or ( (GoB f) * (i,j) = f /. (k + 1) & (GoB f) * ((i + 1),j) = f /. (k + 2) ) ) by SPPOL_1:8;
A17: LSeg (((GoB f) * ((i + 1),j)),((GoB f) * ((i + 1),(j + 1)))) = LSeg ((f /. k),(f /. (k + 1))) by A5, A6, A7, TOPREAL1:def 3;
then ( ( (GoB f) * ((i + 1),(j + 1)) = f /. (k + 1) & (GoB f) * ((i + 1),j) = f /. k ) or ( (GoB f) * ((i + 1),(j + 1)) = f /. k & (GoB f) * ((i + 1),j) = f /. (k + 1) ) ) by SPPOL_1:8;
hence f /. k = (GoB f) * ((i + 1),(j + 1)) by A15, A12, SPPOL_1:8; :: thesis:
thus f /. (k + 1) = (GoB f) * ((i + 1),j) by A17, A16, A12, SPPOL_1:8; :: thesis:
thus f /. (k + 2) = (GoB f) * (i,j) by A17, A16, A12, SPPOL_1:8; :: thesis: