Dimension vectors of elementary modules of generalized Kronecker quivers

Abstract

Let k be an algebraically closed field. The generalized or n-Kronecker quiver K(n) is the quiver with two vertices, called a source and a sink, and n arrows from source to sink. Given a finite-dimensional module M of the path algebra kK(n)=Kn, we consider its dimension vector dim M=(k M1, k M2). Let F=\(x,y) 2nx≤ y≤ x\, and let (x,y)∈F. We construct a module X(x,y) of Kn, and we prove it to be elementary. Suppose that dim M=(x,y). We show that: if M is an elementary module, then x<2n, and when x+y=n+1, the module M is elementary if and only if M is of the form X(x,y).