Top-stable degenerations of finite dimensional representations I

Abstract

Given a finite dimensional representation M of a finite dimensional algebra, two hierarchies of degenerations of M are analyzed in the context of their natural orders: the poset of those degenerations of M which share the top M/JM with M - here J denotes the radical of the algebra - and the sub-poset of those which share the full radical layering (JlM/Jl+1M)l 0 with M. In particular, the article addresses existence of proper top-stable or layer-stable degenerations - more generally, it addresses the sizes of the corresponding posets including bounds on the lengths of saturated chains - as well as structure and classification.