Tilting modules over duplicated algebras

Abstract

Let A be a finite dimensional hereditary algebra over a field k and A(1) the duplicated algebra of A. We first show that the global dimension of endomorphism ring of tilting modules of A(1) is at most 3. Then we investigate embedding tilting quiver K(A) of A into tilting quiver K(A(1)) of A(1). As applications, we give new proofs for some results of D.Happel and L.Unger, and prove that every connected component in K(A) has finite non-saturated points if A is tame type, which gives a partially positive answer to the conjecture of D.Happel and L.Unger in [10]. Finally, we also prove that the number of arrows in K(A) is a constant which does not depend on the orientation of Q if Q is Dynkin type.