let X be set ; :: thesis: for G being Graph
for v1, v2 being Vertex of G
for v9 being Vertex of (AddNewEdge v1,v2) st v9 = v2 & the carrier' of G in X holds
( Edges_In v9,X = (Edges_In v2,X) \/ {the carrier' of G} & Edges_In v2,X misses {the carrier' of G} )
let G be Graph; :: thesis: for v1, v2 being Vertex of G
for v9 being Vertex of (AddNewEdge v1,v2) st v9 = v2 & the carrier' of G in X holds
( Edges_In v9,X = (Edges_In v2,X) \/ {the carrier' of G} & Edges_In v2,X misses {the carrier' of G} )
let v1, v2 be Vertex of G; :: thesis: for v9 being Vertex of (AddNewEdge v1,v2) st v9 = v2 & the carrier' of G in X holds
( Edges_In v9,X = (Edges_In v2,X) \/ {the carrier' of G} & Edges_In v2,X misses {the carrier' of G} )
let v9 be Vertex of (AddNewEdge v1,v2); :: thesis: ( v9 = v2 & the carrier' of G in X implies ( Edges_In v9,X = (Edges_In v2,X) \/ {the carrier' of G} & Edges_In v2,X misses {the carrier' of G} ) )
assume that
A1: v9 = v2 and
A2: the carrier' of G in X ; :: thesis: ( Edges_In v9,X = (Edges_In v2,X) \/ {the carrier' of G} & Edges_In v2,X misses {the carrier' of G} )
set G9 = AddNewEdge v1,v2;
set E = the carrier' of G;
set T = the Target of G;
set E9 = the carrier' of (AddNewEdge v1,v2);
set T9 = the Target of (AddNewEdge v1,v2);
A3: the carrier' of (AddNewEdge v1,v2) = the carrier' of G \/ {the carrier' of G} by Def7;
now
let x be set ; :: thesis: ( ( x in Edges_In v9,X implies x in (Edges_In v2,X) \/ {the carrier' of G} ) & ( x in (Edges_In v2,X) \/ {the carrier' of G} implies b1 in Edges_In v9,X ) )
hereby :: thesis: ( x in (Edges_In v2,X) \/ {the carrier' of G} implies b1 in Edges_In v9,X )
assume A4: x in Edges_In v9,X ; :: thesis: x in (Edges_In v2,X) \/ {the carrier' of G}
then A5: x in X by Def1;
A6: the Target of (AddNewEdge v1,v2) . x = v9 by A4, Def1;
per cases ( x in the carrier' of G or x in {the carrier' of G} ) by A3, A4, XBOOLE_0:def 3;
suppose A7: x in the carrier' of G ; :: thesis: x in (Edges_In v2,X) \/ {the carrier' of G}
then the Target of G . x = v2 by A1, A6, Th40;
then x in Edges_In v2,X by A5, A7, Def1;
hence x in (Edges_In v2,X) \/ {the carrier' of G} by XBOOLE_0:def 3; :: thesis: verum
end;
suppose x in {the carrier' of G} ; :: thesis: x in (Edges_In v2,X) \/ {the carrier' of G}
hence x in (Edges_In v2,X) \/ {the carrier' of G} by XBOOLE_0:def 3; :: thesis: verum
end;
end;
end;
assume A8: x in (Edges_In v2,X) \/ {the carrier' of G} ; :: thesis: b1 in Edges_In v9,X
per cases ( x in Edges_In v2,X or x in {the carrier' of G} ) by A8, XBOOLE_0:def 3;
suppose A9: x in Edges_In v2,X ; :: thesis: b1 in Edges_In v9,X
then the Target of G . x = v2 by Def1;
then A10: the Target of (AddNewEdge v1,v2) . x = v9 by A1, A9, Th40;
( x in X & x in the carrier' of (AddNewEdge v1,v2) ) by A3, A9, Def1, XBOOLE_0:def 3;
hence x in Edges_In v9,X by A10, Def1; :: thesis: verum
end;
suppose A11: x in {the carrier' of G} ; :: thesis: b1 in Edges_In v9,X
A12: the Target of (AddNewEdge v1,v2) . the carrier' of G = v2 by Th39;
( x = the carrier' of G & x in the carrier' of (AddNewEdge v1,v2) ) by A3, A11, TARSKI:def 1, XBOOLE_0:def 3;
hence x in Edges_In v9,X by A1, A2, A12, Def1; :: thesis: verum
end;
end;
end;
hence Edges_In v9,X = (Edges_In v2,X) \/ {the carrier' of G} by TARSKI:2; :: thesis: Edges_In v2,X misses {the carrier' of G}
assume (Edges_In v2,X) /\ {the carrier' of G} <> {} ; :: according to XBOOLE_0:def 7 :: thesis: contradiction
then consider x being set such that
A13: x in (Edges_In v2,X) /\ {the carrier' of G} by XBOOLE_0:def 1;
x in {the carrier' of G} by A13, XBOOLE_0:def 4;
then A14: x = the carrier' of G by TARSKI:def 1;
x in the carrier' of G by A13;
hence contradiction by A14; :: thesis: verum