Dimension vectors with the equal kernels property

Abstract

Let r ∈ N, r be the generalized Kronecker quiver with r arrows γ1,…,γr 1 2 and δ ∈ +(r) be a positive root of r. We say that δ has the equal kernels property if for all α ∈ kr \0\ and every indecomposable representation M with dimension vector dim M = δ the k-linear map Mα := Σri=1 αi M(γi) M1 M2 is injective. We show that δ has the equal kernels property if and only if q_r(δ) + δ2 - δ1 ≥ 1, where q_r Z2 Z, (x,y) x2 + y2 - rxy denotes the Tits quadratic form of r.