On the invariant theory for tame tilted algebras

Abstract

We show that a tilted algebra A is tame if and only if for each generic root of A and each indecomposable irreducible component C of (A,), the field of rational invariants k(C)() is isomorphic to k or k(x). Next, we show that the tame tilted algebras are precisely those tilted algebras A with the property that for each generic root of A and each indecomposable irreducible component C ⊂eq (A,), the moduli space (C)ssθ is either a point or just P1 whenever θ is an integral weight for which Csθ≠ . We furthermore show that the tameness of a tilted algebra is equivalent to the moduli space (C)ssθ being smooth for each generic root of A, each indecomposable irreducible component C ⊂eq (A,), and each integral weight θ for which Csθ ≠ . As a consequence of this latter description, we show that the smoothness of the various moduli spaces of modules for a strongly simply connected algebra A implies the tameness of A. Along the way, we explain how moduli spaces of modules for finite-dimensional algebras behave with respect to tilting functors, and to theta-stable decompositions.