Classifying representations by way of Grassmannians

Abstract

Let be a finite dimensional algebra over an algebraically closed field. Criteria are given which characterize existence of a fine or coarse moduli space classifying, up to isomorphism, the representations of with fixed dimension d and fixed squarefree top T. Next to providing a complete theoretical picture, some of these equivalent conditions are readily checkable from quiver and relations. In case of existence of a moduli space -- unexpectedly frequent in light of the stringency of fine classification -- this space is always projective and, in fact, arises as a closed subvariety GrassTd of a classical Grassmannian. Even when the full moduli problem fails to be solvable, the variety GrassTd is seen to have distinctive properties recommending it as a substitute for a moduli space. As an application, a characterization of the algebras having only finitely many representations with fixed simple top is obtained; in this case of `finite local representation type at a given simple T', the radical layering ( JlM/ Jl+1M )l 0 is shown to be a classifying invariant for the modules with top T. This relies on the following general fact obtained as a byproduct: Proper degenerations of a local module M never have the same radical layering as M.