PVS: pf:r1_TCC2 - proof from ramsey

FDL > PVS > Graphs > ramsey new > r1 TCC2 > pf:r1_TCC2 : proof (10 nodes)

Conclusion

1. FORALL G:Graph[T] : is finite[T](LET (v0:(vert(G)) ) = choose[T](vert(G)) IN {n:T | vert(G)(n) AND (n /= v0) AND edge?[T](G)(v0, n)})

Tactic
SKOSIMP*

Premise 1. (has proof of 9 steps)

1. is finite[T](LET (v0:(vert(G!1)) ) = choose[T](vert(G!1)) IN
{n:T | vert(G!1)(n) AND (n /= v0) AND edge?[T](G!1)(v0, n)})