For a given Banach space E with an 1-unconditional basis, we introduce the (E, E)-approximation property ((E, E)-AP) which is a natural  generalization of the classical approximation property (AP) and the (p, p)-AP. It is shown that the AP always implies the (E, E)-AP. If E has  an 1-unconditional and shrinking basis, then the (E ∗ , E∗ )-AP for X∗ implies the (E, E)-AP for X. If in addition that the unconditional basis  for E is subsymmetric, then X ∗ has the (E ∗ , E∗ )-AP implies that X has the duality (E, E)-AP.