reserve k,m,n for Nat, kk,mm,nn for Element of NAT, A,B,X,Y,Z,x,y,z for set,
S, S1, S2 for Language, s for (Element of S), w,w1,w2 for (string of S),
U,U1,U2 for non empty set, f,g for Function, p,p1,p2 for FinSequence;
reserve u,u1,u2 for Element of U, t for termal string of S,
I for (S,U)-interpreter-like Function,
l, l1, l2 for literal (Element of S), m1, n1 for non zero Nat,
phi0 for 0wff string of S, psi,phi,phi1,phi2 for wff string of S;

theorem Th13: U-deltaInterpreter"{1} =
the set of all <*u,u*> where u is Element of U
proof
set RH=the set of all <*u,u*> where u is Element of U;
set LH=U-deltaInterpreter"{1}, X=(U-concatenation).:(id (1-tuples_on U));
LH=X & X=RH by Lm26, FOMODEL0:38; hence thesis;
end;
