Approximate Jordan derivations on Hilbert \(C^*\)-modules (Q2863557)

Let \({\mathcal M}\) be a Hilbert \(C^*\)-module. A linear mapping \(d : {\mathcal M} \to {\mathcal M}\) is called a Jordan derivation on the Hilbert \(C^*\)-module \({\mathcal M}\) if it satisfies the condition NEWLINE\[NEWLINEd( \big <x, x \big >y) = \big <d(x), x \big >y + \big <x, d(x) \big >y + \big <x, y \big >d(y)NEWLINE\]NEWLINE for every \(x, y \in {\mathcal M}\), where \(\big <\cdot, \cdot \big >\) is a sesquilinear form. In this paper, the authors prove some results concerning the generalized Hyers-Ulam-Rassias stability of Jordan derivations on Hilbert \(C^*\)-modules associated with a generalized Jensen-type function equation NEWLINE\[NEWLINE2 \sum_{j=1}^n f \left ( {{x_j} \over {2}} + \sum_{i=1, i\neq j}^n x_i \right ) + \sum_{i=1}^n f(x_i ) = 2 n f \left ( \sum_{i=1}^n x_i \right ) NEWLINE\]NEWLINE using the direct method and also the fixed point method.