Suppose A is a Banach algebra without order. We show that an approximate multiplier T : A → A is an exact multiplier.

Stability of multipliers on Banach algebras. Miura, Takeshi; Hirasawa, Go; Takahasi, Sin-Ei · International Journal of Mathematics and Mathematical Sciences ...

Sep 16, 2004 · Suppose A is a Banach algebra without order. We show that an approximate multiplier T : A → A is an exact multiplier.

Feb 2, 2004 · Suppose A is a Banach algebra without order. We show that an approximate multiplier T : A → A is an exact multiplier.

If T is approximately additive, then the Hyers-Ulam-Rassias stability of T is proved, which means that T is an exact multiplier on a Banach algebra which ...

Downloadable! Suppose A is a Banach algebra without order. We show that an approximate multiplier T : A → A is an exact multiplier.

In this paper , we will consider Hyers – Ulam – Rassias stability of multipliers and ring derivations between Banach algebras . ... Takahasi , Stability of ...

stability; partial multipliers; Banach ∗-algebras; fixed point method. ... In 2016, Taghavi [46] introduced partial multipliers into complex Banach algebras.

In this paper, we will consider Hyers-Ulam-Rassias stability of multipliers and ring derivations between Banach algebras. As a corollary, we will prove ...

Stability, in this sense, implies both additive and multiplicative stability of Banach algebras. For example, it is noted in before Proposition 6.2 that ...