nLab twisted complex (Rev #10, changes)

Showing changes from revision #9 to #10: | ~~Removed~~ | ~~Chan~~

Context

Homological algebra

Definition

Let $C$ be a differential graded category.

A twisted complex $E$ in $C$ is

a graded set $\{E_i\}_{i \in \mathbb{Z}}$ of objects of $C$ , such that only finitely many $E_i$ are not the zero object;
a set of morphisms $\{q_{i j} : E_i \to E_j \}_{i,j \in \mathbb{Z}}$ such that
- $deg(q_{i j}) = i-j+1$ ;
- $\forall i,j : \; d q_{i j} + \sum_{k} q_{k j}\circ q_{i k} = 0$ .

The differential graded category $PreTr(C)$ of twisted complexes in $C$ has as objects twisted complexes and

PreTr(C)((E_\bullet, q), (E'_\bullet, q'))^k = \coprod_{l + j - i = k} C(E_i, E'_j)^l

with differential given on $f \in C(E_i, E'_j)^l$ given by

d f = d_{C} f + \sum_{m} (q_{j m} \circ f + (- 1)^{l (i - m + 1)} f \circ q_{m i}) .

d f = d_C f + \sum_m (q_{j m}\circ f + (-1)^{l(i-m+1)} f \circ q_{m ~~i})~~ ~~\,.~~

The construction of categories of twisted complexes is functorial in that for $F : C \to C'$ a dg-functor, there is a dg-functor

PreTr (F) : PreTr (C) \to PreTr (C') .

PreTr(F) : PreTr(C) \to ~~PreTr(C')~~ ~~\,.~~

etc.

Properties

Passing from a dg-category to its category of twisted complexes is a step towards enhancing it to a pretriangulated dg-category.

Related concepts

Landau-Ginzburg model, pretriangulated dg-category

Alexei Bondal, Mikhail Kapranov, Enhanced triangulated categories, Матем. Сборник, Том 181 (1990), No.5, 669–683 (Russian); transl. in USSR Math. USSR Sbornik, vol. 70 (1991), No. 1, pp. 93–107, (MR91g:18010) (Bondal-Kapranov Enhanced triangulated categories pdf)

~~Bernhard Keller, A brief introduction to $A_\infty$ -algebras (pdf)~~

~~Mikhail Kapranov, Svyatoslav Pimenov, Derived varieties of complexes and Kostant’s theorem for gl(m|n), arxiv/1504.00339~~

Revision on April 30, 2026 at 22:32:33 by Dmitri Pavlov See the history of this page for a list of all contributions to it.