Total stability functions for type A quivers

Abstract

For a quiver Q of Dynkin type An, we give a set of n-1 inequalities which are necessary and sufficient for a linear stability condition (a.k.a. central charge) Z K0(Q) C to make all indecomposable representations stable. We furthermore show that these are a minimal set of inequalities defining the space TS(Q) of total stability conditions, considered as an open subset of RQ0 × (R>0)Q0. We then use these inequalities to show that each fiber of the projection of TS(Q) to (R>0)Q0 is linearly equivalent to R × R>0Q1.