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چکیده
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Let A be a prime ∗-algebra and � a �- Jordan triple derivation on A, that is, for every A;B;C ∈ A, �(A⋄�B⋄�C) = �(A)⋄�B⋄�C+A⋄��(B)⋄�C+A⋄�B⋄��(C); where A ⋄� B = AB + �BA� such that a complex scalar |�| ̸= 0; 1, and � is additive. Moreover, if �(I) is self-adjoint, then � is a ∗-derivation.
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