let G2 be _Graph; :: thesis: for v, e, w being object
for G1 being addAdjVertex of G2,v,e,w holds
( G1 is finite-ecolorable iff G2 is finite-ecolorable )
let v, e, w be object ; :: thesis: for G1 being addAdjVertex of G2,v,e,w holds
( G1 is finite-ecolorable iff G2 is finite-ecolorable )
let G1 be addAdjVertex of G2,v,e,w; :: thesis: ( G1 is finite-ecolorable iff G2 is finite-ecolorable )
assume G2 is finite-ecolorable ; :: thesis: G1 is finite-ecolorable
then consider n being Nat such that
A2: G2 is n -ecolorable ;
reconsider G2 = G2 as n -ecolorable _Graph by A2;
G1 is addAdjVertex of G2,v,e,w ;
hence G1 is finite-ecolorable ; :: thesis: verum