Ideal approximation theory in Frobenius categories

Abstract

Let A be a Frobenius category and ω the full subcategory consisting of projective objects. The relations between special precovering (resp., precovering) ideals in A and special precovering (resp., preenveloping) ideals in the stable category A/ω are explored. In combination with a result due to Breaz and Modoi, we conclude that every precovering or preenveloping ideal I in A with 1X∈I for any X∈ω is special. As a consequence, it is proved that an ideal cotorsion pair (I,J) in A is complete if and only if I is precovering if and only if J is preenveloping. This leads to an ideal version of the Bongartz-Eklof-Trlifaj Lemma in A/ω, which states that an ideal cotorsion pair in A/ω generated by a set of morphisms is complete. As another consequence, we provide some partial answers to the question about the completeness of cotorsion pairs posed by Fu, Guil Asensio, Herzog and Torrecillas.

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