let X be AffinPlane; :: thesis: ( X is satisfying_Scherungssatz iff ( X is satisfying_minor_Scherungssatz & X is satisfying_major_Scherungssatz ) )
A1: ( X is satisfying_Scherungssatz implies X is satisfying_minor_Scherungssatz )
proof
assume A2: X is satisfying_Scherungssatz ; :: thesis: X is satisfying_minor_Scherungssatz
now :: thesis: for a1, a2, a3, a4, b1, b2, b3, b4 being Element of X
for M, N being Subset of X st M // N & a1 in M & a3 in M & b1 in M & b3 in M & a2 in N & a4 in N & b2 in N & b4 in N & not a4 in M & not a2 in M & not b2 in M & not b4 in M & not a1 in N & not a3 in N & not b1 in N & not b3 in N & a3,a2 // b3,b2 & a2,a1 // b2,b1 & a1,a4 // b1,b4 holds
a3,a4 // b3,b4
let a1, a2, a3, a4, b1, b2, b3, b4 be Element of X; :: thesis: for M, N being Subset of X st M // N & a1 in M & a3 in M & b1 in M & b3 in M & a2 in N & a4 in N & b2 in N & b4 in N & not a4 in M & not a2 in M & not b2 in M & not b4 in M & not a1 in N & not a3 in N & not b1 in N & not b3 in N & a3,a2 // b3,b2 & a2,a1 // b2,b1 & a1,a4 // b1,b4 holds
a3,a4 // b3,b4
let M, N be Subset of X; :: thesis: ( M // N & a1 in M & a3 in M & b1 in M & b3 in M & a2 in N & a4 in N & b2 in N & b4 in N & not a4 in M & not a2 in M & not b2 in M & not b4 in M & not a1 in N & not a3 in N & not b1 in N & not b3 in N & a3,a2 // b3,b2 & a2,a1 // b2,b1 & a1,a4 // b1,b4 implies a3,a4 // b3,b4 )
assume that
A3: M // N and
A4: a1 in M and
A5: a3 in M and
A6: b1 in M and
A7: b3 in M and
A8: a2 in N and
A9: a4 in N and
A10: b2 in N and
A11: b4 in N and
A12: not a4 in M and
A13: not a2 in M and
A14: not b2 in M and
A15: not b4 in M and
A16: not a1 in N and
A17: not a3 in N and
A18: not b1 in N and
A19: not b3 in N and
A20: a3,a2 // b3,b2 and
A21: a2,a1 // b2,b1 and
A22: a1,a4 // b1,b4 ; :: thesis: a3,a4 // b3,b4
A23: N is being_line by A3, AFF_1:36;
M is being_line by A3, AFF_1:36;
hence a3,a4 // b3,b4 by A2, A4, A5, A6, A7, A8, A9, A10, A11, A12, A13, A14, A15, A16, A17, A18, A19, A20, A21, A22, A23; :: thesis: verum
end;
hence X is satisfying_minor_Scherungssatz ; :: thesis: verum
end;
A24: ( X is satisfying_minor_Scherungssatz & X is satisfying_major_Scherungssatz implies X is satisfying_Scherungssatz )
proof
assume that
A25: X is satisfying_minor_Scherungssatz and
A26: X is satisfying_major_Scherungssatz ; :: thesis: X is satisfying_Scherungssatz
now :: thesis: for a1, a2, a3, a4, b1, b2, b3, b4 being Element of X
for M, N being Subset of X st M is being_line & N is being_line & a1 in M & a3 in M & b1 in M & b3 in M & a2 in N & a4 in N & b2 in N & b4 in N & not a4 in M & not a2 in M & not b2 in M & not b4 in M & not a1 in N & not a3 in N & not b1 in N & not b3 in N & a3,a2 // b3,b2 & a2,a1 // b2,b1 & a1,a4 // b1,b4 holds
a3,a4 // b3,b4
let a1, a2, a3, a4, b1, b2, b3, b4 be Element of X; :: thesis: for M, N being Subset of X st M is being_line & N is being_line & a1 in M & a3 in M & b1 in M & b3 in M & a2 in N & a4 in N & b2 in N & b4 in N & not a4 in M & not a2 in M & not b2 in M & not b4 in M & not a1 in N & not a3 in N & not b1 in N & not b3 in N & a3,a2 // b3,b2 & a2,a1 // b2,b1 & a1,a4 // b1,b4 holds
a3,a4 // b3,b4
let M, N be Subset of X; :: thesis: ( M is being_line & N is being_line & a1 in M & a3 in M & b1 in M & b3 in M & a2 in N & a4 in N & b2 in N & b4 in N & not a4 in M & not a2 in M & not b2 in M & not b4 in M & not a1 in N & not a3 in N & not b1 in N & not b3 in N & a3,a2 // b3,b2 & a2,a1 // b2,b1 & a1,a4 // b1,b4 implies a3,a4 // b3,b4 )
assume that
A27: M is being_line and
A28: N is being_line and
A29: a1 in M and
A30: a3 in M and
A31: b1 in M and
A32: b3 in M and
A33: a2 in N and
A34: a4 in N and
A35: b2 in N and
A36: b4 in N and
A37: not a4 in M and
A38: not a2 in M and
A39: not b2 in M and
A40: not b4 in M and
A41: not a1 in N and
A42: not a3 in N and
A43: not b1 in N and
A44: not b3 in N and
A45: a3,a2 // b3,b2 and
A46: a2,a1 // b2,b1 and
A47: a1,a4 // b1,b4 ; :: thesis: a3,a4 // b3,b4
now :: thesis: ( not M // N implies a3,a4 // b3,b4 )
assume not M // N ; :: thesis: a3,a4 // b3,b4
then ex o being Element of X st
( o in M & o in N ) by A27, A28, AFF_1:58;
hence a3,a4 // b3,b4 by A26, A27, A28, A29, A30, A31, A32, A33, A34, A35, A36, A37, A38, A39, A40, A41, A42, A43, A44, A45, A46, A47; :: thesis: verum
end;
hence a3,a4 // b3,b4 by A25, A29, A30, A31, A32, A33, A34, A35, A36, A37, A38, A39, A40, A41, A42, A43, A44, A45, A46, A47; :: thesis: verum
end;
hence X is satisfying_Scherungssatz ; :: thesis: verum
end;
thus ( X is satisfying_Scherungssatz iff ( X is satisfying_minor_Scherungssatz & X is satisfying_major_Scherungssatz ) ) by A1, A24; :: thesis: verum