| Abstrakt: |
It is well known that the Baer criterion for injectivity of R -modules, for a ring R with unit, is not true in a general category, even in a general abelian category. In this paper, we prove some results analogous to the Baer criterion for injectivity in abelian categories and Grothendieck categories. In particular, we generalize the known fact that G -injectivity is the same as injectivity, if G is a generator in a Grothendieck category. Furthermore, some Baer type theorems for general abelian categories are proved. Finally, equivalent conditions to satisfying a classical kind of Baer criterion are found in (locally presentable) abelian categories. [ABSTRACT FROM AUTHOR] |
