Cotorsion pairs in (d+2)-angulated categories
Abstract
Let C be a (d+2)-angulated category. In this paper, we define the notions of cotorsion pairs and weak cotorsion pairs in C, which are generalizations of the classical cotorsion pairs in triangulated categories. As an application, we give a geometric characterization of weak cotorsion pairs in (d+2)-angulated cluster categories of type A. Moreover, we prove that any mutation of a (weak) cotorsion pair in C is again a (weak) cotorsion pair. When d=1, this result generalizes the work of Zhou and Zhu on classical cotorsion pairs in triangulated categories.
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