Non-semistable exceptional objects in hereditary categories: some remarks and conjectures

Abstract

In our previous paper we studied non-semistable exceptional objects in hereditary categories and introduced the notion of regularity preserving category, but we obtained quite a few examples of such categories. Certain conditions on the Ext-nontrivial couples (exceptional objects X,Y∈ A with Ext1(X,Y)≠ 0 and Ext1(Y,X)≠ 0) were shown to imply regularity-preserving. This paper is a brief review of the previous paper (with emphasis on regularity preserving property) and we add some remarks and conjectures. It is known that in Dynkin quivers Hom(,')=0 or Ext1(,')=0 for any two exceptional representations. In the present paper we use this property to show that for any Dynkin quiver Q there are no Ext-nontrivial couples in Repk(Q), which implies regularity preserving of Repk(Q), where k is an algebraically closed field. We study this property in other quivers. In particular in any star quiver with three arms Q for any two exceptional representations , ' we have Hom(,')=0 or Ext1(,')=0 provided that or ' is a thin representation. In the previous version we asserted falsely that this holds for any two exceptional representations (without imposing the restriction that one of them is thin) for extended Dynkin quivers E6, E7, E8 .