reserve x,O for set,
  o for Element of O,
  G,H,I for GroupWithOperators of O,
  A, B for Subset of G,
  N for normal StableSubgroup of G,
  H1,H2,H3 for StableSubgroup of G,
  g1,g2 for Element of G,
  h1,h2 for Element of H1,
  h for Homomorphism of G,H;
reserve E for set,
  A for Action of O,E,
  C for Subset of G,
  N1 for normal StableSubgroup of H1;
reserve y for set,
  H19,H29 for StableSubgroup of G,
  N19 for normal StableSubgroup of H19,
  s1,s19,s2,s29 for CompositionSeries of G,
  fs for FinSequence of the_stable_subgroups_of G,
  f1,f2 for FinSequence,
  i,j,n for Nat;

theorem
  for X being set, P,R being Relation holds P*(R|X) = (X|`P)*R by Lm36;
