In this paper, we introduce the new notions of �-bi atness, �-biprojectivity, �-Johnson amenability and �-Johnson contractibility for Banach algebras, where � is a non-zero homomorphism from a Banach algebra A into C. We show that a Banach algebra A is �-Johnson amenable if and only if it is �-inner amenable and �-bi at. Also we show that �-Johnson amenability is equivalent with the existence of left and right �-means for A. We give some examples to show di erences between these new notions and the classical ones. Finally, we show that L1(G) is �-bi at if and only if G is an amenable group and A(G) is �-biprojective if and only if G is a discrete group.
