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چکیده
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Given Banach algebras A and B and � 2 �(B). We shall study the Johnson pseudo-contractibility and pseudo-amenability of the �-Lau product A �� B. We show that if A �� B is Johnson pseudo-contractible, then both A and B are Johnson pseudo-contractible and A has a bounded approximate identity. In some particular cases, a complete characterization of Johnson pseudo-contractibility of A �� B are given. Also, we show that pseudo-amenability of A �� B implies the approximate amenability of A and pseudo-amenability of B.
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