For a Banach algebra A with a character � 2 �(A), we investigate the relation of �-bi atness and left �-amenability. For the Segal algebra S(G), related to a locally compact group G, we show that if S(G)�� is �-bi at, then G is an amenable group. For a symmetric Segal algebra S(G), we show that S(G) is �????bi at if and only if G is amenable. We introduce a new notion of bounded character bi at Banach algebras and study its maximal ideal space. We study the homological proprties of a class of matrix algebras. We show that for a nonempty totally ordered set I with a smallest element, upper triangular I � I-matrix algebra, say UPI (A) is bi at if and only if A is bi at and I is singleton, provided that �(A) is non-empty and A has a right identity. Also we give a class of non bi at Banach algebras.
