English

Higher differential objects in additive categories

Representation Theory 2019-12-24 v1 Category Theory Rings and Algebras

Abstract

Given an additive category C\mathcal{C} and an integer n2n\geqslant 2. We form a new additive category C[ϵ]n\mathcal{C}[\epsilon]^n consisting of objects XX in C\mathcal{C} equipped with an endomorphism ϵX\epsilon_X satisfying ϵXn=0{\epsilon^n_X}=0. First, using the descriptions of projective and injective objects in C[ϵ]n\mathcal{C}[\epsilon]^n, we not only establish a connection between Gorenstein flat modules over a ring RR and R[t]/(tn)R[t]/(t^n), but also prove that an Artinian algebra RR satisfies some homological conjectures if and only if so does R[t]/(tn)R[t]/(t^n). Then we show that the corresponding homotopy category \K(C[ϵ]n)\K(\mathcal{C}[\epsilon]^n) is a triangulated category when C\mathcal{C} is an idempotent complete exact category. Moreover, under some conditions for an abelian category A\mathcal{A}, the natural quotient functor QQ from \K(A[ϵ]n)\K(\mathcal{A}[\epsilon]^n) to the derived category \D(A[ϵ]n)\D(\mathcal{A}[\epsilon]^n) produces a recollement of triangulated categories. Finally, we prove that if A\mathcal{A} is an Ab4-category with a compact projective generator, then \D(A[ϵ]n)\D(\mathcal{A}[\epsilon]^n) is a compactly generated triangulated category.

Keywords

Cite

@article{arxiv.1912.10409,
  title  = {Higher differential objects in additive categories},
  author = {Xi Tang and Zhaoyong Huang},
  journal= {arXiv preprint arXiv:1912.10409},
  year   = {2019}
}

Comments

30 pages, accepted for publication in Journal of Algebra

R2 v1 2026-06-23T12:53:41.598Z