Localization of triangulated categories with respect to extension-closed subcategories

Abstract

The aim of this paper is to develop a framework for localization theory of triangulated categories C, that is, from a given extension-closed subcategory N of C, we construct a natural extriangulated structure on C together with an exact functor Q:CCN satisfying a suitable universality, which unifies several phenomena. Precisely, a given subcategory N is thick if and only if the localization CN corresponds to a triangulated category. In this case, Q is nothing other than the usual Verdier quotient. Furthermore, it is revealed that CN is an exact category if and only if N satisfies a generating condition cone(N,N)=C. Such an (abelian) exact localization CN provides a good understanding of some cohomological functors CAb, e.g., the heart of t-structures on C and the abelian quotient of C by a cluster-tilting subcategory N.

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