let G be _finite _Graph; :: thesis: ex p being non empty Graph-yielding _finite FinSequence st
( p . 1 is edgeless & p . (len p) = G & len p = (G .size()) + 1 & ( for n being Element of dom p st n <= (len p) - 1 holds
ex v1, v2 being Vertex of G ex e being object st
( p . (n + 1) is addEdge of p . n,v1,e,v2 & e in (the_Edges_of G) \ (the_Edges_of (p . n)) & v1 in the_Vertices_of (p . n) & v2 in the_Vertices_of (p . n) ) ) )
set H = the spanning edgeless Subgraph of G;
consider p being non empty Graph-yielding _finite FinSequence such that
A1: ( p . 1 == the spanning edgeless Subgraph of G & p . (len p) = G & len p = ((G .size()) - ( the spanning edgeless Subgraph of G .size())) + 1 ) and
A2: for n being Element of dom p st n <= (len p) - 1 holds
ex v1, v2 being Vertex of G ex e being object st
( p . (n + 1) is addEdge of p . n,v1,e,v2 & e in (the_Edges_of G) \ (the_Edges_of (p . n)) & v1 in the_Vertices_of (p . n) & v2 in the_Vertices_of (p . n) ) by Th64;
take p ; :: thesis: ( p . 1 is edgeless & p . (len p) = G & len p = (G .size()) + 1 & ( for n being Element of dom p st n <= (len p) - 1 holds
ex v1, v2 being Vertex of G ex e being object st
( p . (n + 1) is addEdge of p . n,v1,e,v2 & e in (the_Edges_of G) \ (the_Edges_of (p . n)) & v1 in the_Vertices_of (p . n) & v2 in the_Vertices_of (p . n) ) ) )
thus ( p . 1 is edgeless & p . (len p) = G ) by A1, Th52; :: thesis: ( len p = (G .size()) + 1 & ( for n being Element of dom p st n <= (len p) - 1 holds
ex v1, v2 being Vertex of G ex e being object st
( p . (n + 1) is addEdge of p . n,v1,e,v2 & e in (the_Edges_of G) \ (the_Edges_of (p . n)) & v1 in the_Vertices_of (p . n) & v2 in the_Vertices_of (p . n) ) ) )
thus len p = ((G .size()) - 0) + 1 by A1, Th49
.= (G .size()) + 1 ; :: thesis: for n being Element of dom p st n <= (len p) - 1 holds
ex v1, v2 being Vertex of G ex e being object st
( p . (n + 1) is addEdge of p . n,v1,e,v2 & e in (the_Edges_of G) \ (the_Edges_of (p . n)) & v1 in the_Vertices_of (p . n) & v2 in the_Vertices_of (p . n) )
thus for n being Element of dom p st n <= (len p) - 1 holds
ex v1, v2 being Vertex of G ex e being object st
( p . (n + 1) is addEdge of p . n,v1,e,v2 & e in (the_Edges_of G) \ (the_Edges_of (p . n)) & v1 in the_Vertices_of (p . n) & v2 in the_Vertices_of (p . n) ) by A2; :: thesis: verum