Semilocal modules and quasi-hereditary algebras

## dedicated to professor idun reiten for her 60th birthday We study Auslander's representation dimension of Artin algebras, which is by definition the minimal projective dimension of coherent functors on modules which are both generators and cogenerators. We show the following statements: (1) if

The fundamental theorem on representation-finite quivers in 6 indicates a close connection between the representation type of a quiver and the definiteness of a certain quadratic form. Later a similar connection was discovered in other classification problems of representation theory. It turns out t

Let \(A\) be a finite-dimensional algebra over an algebraically closed field. If \(A\) is an \(\mathscr{F}(\Delta)\)-finite quasi-hereditary algebra, then the endomorphism algebra of the direct sum of all non-isomorphic indecomposable \(\Delta\)-good modules over \(A\) is quasi-hereditary. Moreover,