Özet:
The object of the present paper is to study generalized complex space forms satisfying curvature identities named
Walker type identities. Also It is proved that the difference tensor R. ̃ – ̃.R and the Tachibana tensor Q(S, ̃) of any
generalized complex space form M(f1, f2) of dimensional m ≥ 4 are linearly dependent at every point of M(f1, f2). Finally
generalized complex space forms are studied under the condition R.R – Q(S,R) = L Q(g , ̃).