... general-ization of [7], of (A(n, d, μ, q))∗cop. Our main result is to give the structure of projective modules of D(Γn,d). By this, we give the Ext-quiver (with relations) of D (Γn,d)andshowthatD(Γn,d) ... >−−1, the elements XsKu,jandXsFu,jare linearly independent.Proof. The proof of this lemma is same to the proof of Lemma 2.18 in [7]. Forcompleteness, we write it out.Assume that αXsKu,j+ ... σ2nd−1u(j).Proof. The proof is same to that of Theorem 2.25 in [7].An algebra A is said to be of finite representation type provided there arefinitely many non-isomorphic indecomposable A-modules. A is of...