On the vanishing of Ext and Tor

Abstract

This paper contains two theorems concerning the vanishing of natural transformations of (co)homology functors. Precisely, assume that R is a right noetherian ring and f: M N is a morphism of finitely generated right R-modules. The first theorem proves that the natural transformation 1(f, -) vanishes over the category of finitely generated right R-modules if and only if 1(f, -) vanishes over the category of finitely generated left R-modules. As a corollary of this result, we establish that 1(f, -) is epic if and only if 1(f, -) is monic. The second theorem shows that if R is left and right noetherian and M, N are Gorenstein projective, then the natural transformations 1(f, -), 1(-, f) and 1(f, -) vanish over the category of finitely generated Gorenstein projective modules, simultaneously. This, in particular, yields that over Gorenstein projective modules, the notions of phantom morphisms and -phantom morphisms coincide. Also, it is proved that if R is n-Gorenstein, then for any integer i>n, the natural transformations i(f, -), i(-, f) and i(f, -) vanish over finitely generated modules, simultaneously. As an interesting consequence, we show that under the same assumptions, i(-, f) is epic (resp. monic) if and only if i(f, -) is monic (resp. epic) if and only if i(f, -) is epic (resp. monic).