In this paper, we investigate the stability and superstability of a specific class of functional inequalities associated with centrally extended *-derivations on Banach *-algebras. A CE *-derivation δ:R→R is defined as an additive mapping satisfying δ(x+y)−δ(x)−δ(y)∈Z(R) and δ(xy)−δ(x)y*−xδ(y)∈Z(R) for all x,y∈R, where Z(R) denotes the center of the ring. We consider the functional inequality ∥a1δ(x1)+a2δ(x2)+a3δ(x3),w∥≤∥δ(a1x1+a2x2+a3x3),w∥+Φ(x1,x2,x3,w), where Φ is a perturbing term. By employing the direct method, we establish several theorems concerning the Hyers–Ulam stability of this inequality in the context of unital Banach *-algebras. Furthermore, we provide sufficient conditions under which these functional inequalities exhibit superstability. We also explore the implications of our results for linear *-derivations in semiprime Banach *-algebras with no nonzero central ideals.
Chang et al. (Wed,) studied this question.
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