Completeness of the induced cotorsion pairs in functor categories

Abstract

This paper focuses on a question raised by Holm and Jrgensen, who asked if the induced cotorsion pairs (( X),( X)) and (( Y),( Y)) in Rep(Q,A) -- the category of all A-valued representations of a quiver Q -- are complete whenever ( X, Y) is a complete cotorsion pair in an abelian category A satisfying some mild conditions. Recently, Odabas gave an affirmative answer if the quiver Q is rooted and the cotorsion pair ( X, Y) is further hereditary. In this paper, we improve Odabas's work by removing the hereditary assumption on the cotorsion pair. As an application, we show under certain mild conditions that if a subcategory L, which is not necessarily closed under direct summands, of A is special precovering (resp., preenveloping), then ( L) (resp., ( L)) is special precovering (resp., preenveloping) in Rep(Q,A).