theorem Th113:
  for G2 being reverseEdgeDirections of G1, E
  holds G1 is finite-ecolorable iff G2 is finite-ecolorable
proof
  let G2 be reverseEdgeDirections of G1, E;
  thus G1 is finite-ecolorable implies G2 is finite-ecolorable;
  G1 is reverseEdgeDirections of G2, E by GLIB_007:3;
  hence thesis;
end;
