Irreducible components of varieties of representations I. The local case

Abstract

Let be a local truncated path algebra over an algebraically closed field K, i.e., is a quotient of a path algebra KQ by the paths of length L+1, where Q is the quiver with a single vertex and a finite number of loops and L is a positive integer. For any d>0, we determine the irreducible components of the varieties that parametrize the d-dimensional representations of , namely, the components of the classical affine variety Repd() and -- equivalently -- those of the projective parametrizing variety GRASSd(). Our method is to corner the components by way of a twin pair of upper semicontinuous maps from Repd() to a poset consisting of sequences of semisimple modules. An excerpt of the main result is as follows. Given a sequence S = ( S0, ..., SL) of semisimple modules with 0 l L Sl = d, let Rep\, S be the subvariety of Repd() consisting of the points that parametrize the modules with radical layering S. (The radical layering of a -module M is the sequence (Jl M / Jl+1 M)0 l L, where J is the Jacobson radical of .) Suppose the quiver Q has r 2 loops. If d L+1, the variety Repd() is irreducible. If, on the other hand, d > L+1, then the irreducible components of Repd() are the closures of the subvarieties Rep\, S for those sequences S which satisfy the inequalities Sl r Sl+1 and Sl+1 r Sl for 0 l < L. As a byproduct, the main result provides generic information on the modules corresponding to the irreducible components of the parametrizing varieties.