Approximations of injective modules and finitistic dimension

Abstract

Let be an artin algebra and let P<∞ the category of finitely generated right -modules of finite projective dimension. We show that P<∞ is contravariantly finite in mod\, if and only if the direct sum E of the indecomposable Ext-injective modules in P<∞ form a tilting module in mod\,. Moreover, we show that in this case E coincides with the direct sum of the minimal right P<∞-approximations of the indecomposable -injective modules and that the projective dimension of E equal to the finitistic dimension of .