ICE-closed subcategories and epibricks over recollements
Abstract
Let ( A',A,A'',i,i,i!,j!,j,j) be a recollement of abelian categories. We proved that every ICE-closed subcategory (resp. epibrick, monobrick) in A' or A'' can be extended to an ICE-closed subcategories (resp. epibrick, monobrick) in A, and the assignment C j*(C) defines a bijection between certain ICE-closed subcategories in A and those in A''. Moreover, the ICE-closed subcategory C of A containing i(A') admits a new recollement relative to ICE-closed subcategories A' and j(C) which induced from the original recollement when j!j(C)⊂C.
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