Localization of n-exangulated categories

Abstract

Nakaoka-Ogawa-Sakai considered the localization of an extriangulated category. This construction unified the Serre quotient of abelian categories and the Verdier quotient of triangulated categories. Recently, Herschend-Liu-Nakaoka defined n-exangulated categories as a higher dimensional analogue of extriangulated categories. Let C be an n-exangulated category and F be a multiplicative system satisfying mild assumption. In this article, we give a necessary and sufficient condition for the localization of C be an n-exangulated category. This way gives a new class of n-exangulated categories which are neither n-exact nor (n+2)-angulated in general. Moreover, our result also generalizes work by Nakaoka-Ogawa-Sakai.

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