let H be ZF-formula; :: thesis: for x, y being Variable st H is universal holds
( the_scope_of (H / x,y) = (the_scope_of H) / x,y & ( bound_in H = x implies bound_in (H / x,y) = y ) & ( bound_in H <> x implies bound_in (H / x,y) = bound_in H ) )
let x, y be Variable; :: thesis: ( H is universal implies ( the_scope_of (H / x,y) = (the_scope_of H) / x,y & ( bound_in H = x implies bound_in (H / x,y) = y ) & ( bound_in H <> x implies bound_in (H / x,y) = bound_in H ) ) )
assume A1: H is universal ; :: thesis: ( the_scope_of (H / x,y) = (the_scope_of H) / x,y & ( bound_in H = x implies bound_in (H / x,y) = y ) & ( bound_in H <> x implies bound_in (H / x,y) = bound_in H ) )
then H / x,y is universal by Th184;
then A2: H / x,y = All (bound_in (H / x,y)),(the_scope_of (H / x,y)) by ZF_LANG:62;
A3: H = All (bound_in H),(the_scope_of H) by A1, ZF_LANG:62;
then A4: ( bound_in H <> x implies H / x,y = All (bound_in H),((the_scope_of H) / x,y) ) by Th173;
( bound_in H = x implies H / x,y = All y,((the_scope_of H) / x,y) ) by A3, Th174;
hence ( the_scope_of (H / x,y) = (the_scope_of H) / x,y & ( bound_in H = x implies bound_in (H / x,y) = y ) & ( bound_in H <> x implies bound_in (H / x,y) = bound_in H ) ) by A2, A4, ZF_LANG:12; :: thesis: verum