Let A be a complex Banach algebra and Lr (Ll ) be the lattice of all closed right (left) ideals in A. Following Tomiuk (5), we say that A is a right complemented algebra if there exists a mapping I —> IP of Lτ into Lr such that if I ∊ Lr , then I ∩ Ip = (0), (Ip )p = I, I ⴲ Ip = A and if I 1, I 2 ∊ Lr with I 1 ⊆ I 2 then .

If in a Banach algebra A every proper closed right ideal has a non-zero left annihilator, then A is called a left annihilator algebra. If, in addition, the corresponding statement holds for every proper closed left ideal and r(A) = (0) = l(A), A is called an annihilator algebra (1).