let V be set ; :: thesis: for G being Graph
for v1, v2 being Element of G
for p being oriented Chain of G st p is_orientedpath_of v1,v2,V & v1 <> v2 holds
v1 in V
let G be Graph; :: thesis: for v1, v2 being Element of G
for p being oriented Chain of G st p is_orientedpath_of v1,v2,V & v1 <> v2 holds
v1 in V
let v1, v2 be Element of G; :: thesis: for p being oriented Chain of G st p is_orientedpath_of v1,v2,V & v1 <> v2 holds
v1 in V
let p be oriented Chain of G; :: thesis: ( p is_orientedpath_of v1,v2,V & v1 <> v2 implies v1 in V )
assume that
A1: p is_orientedpath_of v1,v2,V and
A2: v1 <> v2 ; :: thesis: v1 in V
p is_orientedpath_of v1,v2 by A1;
then A3: v1 in vertices p by Th27;
not v1 in {v2} by A2, TARSKI:def 1;
then A4: v1 in (vertices p) \ {v2} by A3, XBOOLE_0:def 5;
(vertices p) \ {v2} c= V by A1;
hence v1 in V by A4; :: thesis: verum