Representation-tame algebras need not be homologically tame

Abstract

We show that, also within the class of representation-tame finite dimensional algebras , the big left finitistic dimension of may be strictly larger than the little. In fact, the discrepancies Findim - findim need not even be bounded for special biserial algebras which constitute one of the (otherwise) most thoroughly understood classes of tame algebras. More precisely: For every positive integer r, we construct a special biserial algebra with the property that findim = r + 1, while Findim = 2r + 1. In particular, there are infinite dimensional representations of which have finite projective dimension, while not being direct limits of finitely generated\/ representations of finite projective dimension.