Indecomposable Jordan types of Loewy length 2

Abstract

Let k be an algebraically closed field, char(k) = p ≥ 2 and Er be a p-elementary abelian group of rank r ≥ 2. Let (c,d) ∈ N2. We show that there exists an indecomposable module of constant Jordan type [1]c [2]d and Loewy length 2 if and only if q_r(d,d+c) ≤ 1 and c ≥ r-1, where q_r(x,y) := x2 + y2-rxy denotes the Tits form of the generalized Kronecker quiver r. Since p > 2 and constant Jordan type [1]c [2]d imply Loewy length ≤ 2, we get in this case the full classification of Jordan types [1]c [2]d that arise from indecomposable modules.