Ext-quivers of hearts of A-type and the orientation of associahedron

Abstract

We classify the Ext-quivers of hearts in the bounded derived category D(An) and the finite-dimensional derived category D(N An) of the Calabi-Yau-N Ginzburg algebra D(N An). This provides the classification for Buan-Thomas' colored quiver for higher clusters of A-type. We also give explicit combinatorial constructions from a binary tree with n+2 leaves to a torsion pair in mod kAn and a cluster tilting set in the corresponding cluster category, for the straight oriented A-type quiver An. As an application, we show that the orientation of the n-dimensional ssociahedron induced by poset structure of binary trees coincides with the orientation induced by poset structure of torsion pairs in mod kAn (under the correspondence above).