reserve x for set;
reserve k, l for Nat;
reserve p, q for FinSequence;
reserve R for Relation;
reserve p, q for RedSequence of R;
reserve E for set;
reserve s, t for XFinSequence;
reserve p, q for XFinSequence-yielding FinSequence;
reserve E for set;
reserve S, T, U for semi-Thue-system of E;
reserve s, t, s1, t1, u, v, u1, v1, w for Element of E^omega;
reserve p for FinSequence of E^omega;

theorem
  p is RedSequence of ==>.-relation(S) implies t ^+ p +^ u is
  RedSequence of ==>.-relation(S)
proof
  assume p is RedSequence of ==>.-relation(S);
  then t ^+ p is RedSequence of ==>.-relation(S) by Th23;
  hence thesis by Th23;
end;
