Computation of extension spaces for the path algebra of type A(n-1,1) using planar curves

Abstract

Q is a quiver of type A(n-1,1) if its graph is of affine type An-1 and if its arrows have a certain orientation. We develop a bijection between the set of indecomposable kQ-modules whose dimension vectors are positive real roots of the root system associated to Q and a certain set of planar curves. We prove that the number of self-intersections of the curve which corresponds to the module M is equal to the dimension of Ext1kQ(M,M). We also prove that, for many pairs of modules (M,N), the number of intersections between the corresponding two curves is equal to the dimension of Ext1C (M,N), where C is the cluster category of kQ-mod.