Coxeter matrices and homological quadratic forms of n-hereditary algebras

Abstract

We study the Coxeter matrices and the homological quadratic forms of n-hereditary algebras within the framework of higher dimensional Auslander--Reiten theory. Let be a finite dimensional n-hereditary algebra with the Coxeter matrix and the homological quadratic form . We prove that if is n-representation finite, then there exists a positive integer d such that d=1. In the case n is an odd number, we show that if there exists a positive integer d such that d=1, then is n-representation finite. Let C0 be the subcategory of which is a higher analogue of the module category in the context of higher dimensional Auslander--Reiten theory. We introduce a Grothendieck group K0(C0) associated with C0 and show that it is isomorphic to the Grothendieck group of . We further prove that if the restriction of to K0(0) is positive definite, then is n-representation finite for odd n. To prove these results, we first show that indecomposable n-preprojective and n-preinjective modules are uniquely determined up to isomorphism by their dimension vectors for odd n. We also provide examples of n-representation finite algebras that the restriction of to K0(0) is not positive definite.