n-exact categories arising from n-exangulated categories
Abstract
Let C be a Krull-Schmidt n-exangulated category and A be an n-extension closed subcategory of C. Then A inherits the n-exangulated structure from the given n-exangulated category in a natural way. This construction gives n-exangulated categories which are not n-exact categories in the sense of Jasso nor (n+2)-angulated categories in the sense of Geiss-Keller-Oppermann in general. Furthermore, we also give a sufficient condition on when an n-exangulated category A is an n-exact category. These results generalize work by Klapproth and Zhou.
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