Construction of d-abelian categories via derived categories

Abstract

In this work, we provide a simple way to construct d-abelian categories via bounded derived categories for certain values of d. Namely, let C be an abelian category, and let C[0,m] denote the full subcategory of the bounded derived category of C whose objects X satisfy that H*(X) is concentrated in degrees j where 0 ≤ j ≤ m. We prove that if C is hereditary, then C[0,m] is a d-abelian category where d = 3m + 1. Beyond offering a uniform method for constructing d-abelian categories, this construction allows us to create d-abelian categories that exhibit some unexpected properties depending on the choice of the category C. For instance, if C is the category of abelian groups, then C[0,m] is a d-abelian category which is not K-linear over a field K but has set indexed products and coproducts. Similarly, if C is the category of coherent sheaves over certain algebraic curves, then C[0,m] is a d-abelian category without enough injectives. We extend our results to (n+2)-angulated categories. Namely, let M be an n-cluster tilting object over an n-representation finite algebra and let T be the corresponding (n+2)-angulated category with n-suspension functor n. We prove that the full subcategory T[0,m] = add mj=0jn M is a d-abelian category where d = (n+2)(m+1)-2. Furthermore, we show that there is a bijection between the functorially finite wide subcategories of add\,M and the functorially finite repetitive wide subcategories of T[0,m].