Abstract :
In this paper we investigate some hereditary properties of amenability modulo anideal of Banach algebras. We show that if $(e_\alpha)_\alpha$ is a bounded approximate identity modulo Iof a Banach algebra A and X is a neo-unital modulo I, then $(e_\alpha)_\alpha$is a bounded approximateidentity for X. Moreover we show that amenability modulo an ideal of a Banach algebra Acan be only considered by the neo-unital modulo I Banach algebra over A.
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