Gluing of cotorsion pairs via recollements of abelian categories

Abstract

Let ( A',A,A'',i,i,i!,j!,j,j) be a recollement of abelian categories. Suppose that we are given two cotorsion pairs (U',V') and (U'',V'') in A' and A'', respectively. We construct two cotorsion pairs (NV''V',NV''V') and (MU''U', (MU''U')) in A. Moreover, we provide a sufficient condition for these two cotorsion pairs to coincide, and we investigate the heredity and completeness of (MU''U',NV''V'). These results are applied to construct new cotorsion pairs in Morita rings. In the course of proof, we introduce a specific constraint on recollements of abelian categories, requiring P to be a monomorphism for any projective P ∈ A, with : j!j* idA being the counit of (j!, j*). Such recollements enjoy rich homological properties and hence might be of independent interest.

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