Semibricks in extriangulated categories
Abstract
Let X be a semibrick in an extriangulated category C. Let T be the filtration subcategory generated by X. We give a one-to-one correspondence between simple semibricks and length wide subcategories in C. This generalizes a bijection given by Ringel in module categories, which has been generalized by Enomoto to exact categories. Moreover, we also give a one-to-one correspondence between cotorsion pairs in T and certain subsets of X. Applying to the simple minded systems of an triangulated category, we recover a result given by Dugas.
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