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7 votes
2 answers
314 views

How to get an $E_\infty$-ring from a commutative differential graded ring?

I want to figure out the following question: How to get an $E_\infty$-ring from a commutative differential graded ring? More precisely, let $\operatorname{cdga}$ be the ($1$-)category of cdgas, let $...
Yebo Peng's user avatar
3 votes
1 answer
152 views

Homotopy coherent transformation and totalization

Let $C$ be the category of chain complexes over a field $F$ and $C^\prime$ be the subcategory of chain complexes with zero differentials. If $X:I\to C$ is a functor, there is an induced "homology&...
vap's user avatar
  • 410
6 votes
1 answer
309 views

Comparing the Stacks Project Homotopy limit with limits in the $\infty$-category

In the Stacks project Tag 08TC, there is a definition of a homotopy limit in a derived category, and I expect it to compare with a limit in the $\infty$-categorical enhancement. I guess this is also ...
user141099's user avatar
3 votes
2 answers
242 views

Adjunctions and inverse limits of derived categories

Consider a tower $\dots\to A_{2}\to A_{1}$ of rings. This gives rise to a diagram $\mathbb{N}^{\text{op}}\to\text{Cat}_{\infty}$ of $\infty$-categories (confusing $\mathbb{N}^{\text{op}}$ with its ...
user141099's user avatar
7 votes
0 answers
273 views

Homotopy theory of differential objects

In Kashiwara and Schapira's wonderful book Categories and Sheaves, they define a category with translation to be a category $\mathsf{C}$ equipped with an auto-equivalence $S: \mathsf{C} \to \mathsf{C}$...
ಠ_ಠ's user avatar
  • 6,025
2 votes
0 answers
310 views

Invariants of objects in $\operatorname{Ch}(\mathrm{Ab})$ up to chain homotopy

$\newcommand\Ab{\mathrm{Ab}}\newcommand\ab{\mathrm{ab}}\DeclareMathOperator\Ch{Ch}\DeclareMathOperator\Kom{Kom}\newcommand\ho{\mathrm{ho}}$Let $\Ab$ be the category of finitely generated abelian ...
Student's user avatar
  • 5,230
10 votes
1 answer
956 views

Reference request: infinity categories for the commutive algebraist/algebraic geometer

In a survey article Algebraic geometry in mixed characteristic, B. Bhatt writes For instance, given a commutative ring $R$ with a finitely generated ideal $I$, the assignment carrying $R$ to the $\...
usr0192's user avatar
  • 785
8 votes
2 answers
899 views

Derived functors out of an unbounded derived $\infty$-category

Let $\mathcal A$ be an abelian category. In this lecture, Thomas Nikolaus Defines the unbounded derived category $\mathcal D(\mathcal A)$ as $\mathcal K(\mathcal A)[W^{-1}]$, where $\mathcal K(\...
Tomo's user avatar
  • 1,217
7 votes
1 answer
812 views

How to prove that topological Hochschild homology of a smooth proper stable k-linear infinity category is dualizable?

Let $k$ be a perfect field of characteristic $p$. I heard that the Topological Hochschild homology of a smooth proper stable infinity category (or dg-category) is dualizable as a THH(k)-module ...
Keiho Matsumoto's user avatar
3 votes
0 answers
170 views

Do we really need degeneracies for spectral sequence of homotopy simplicial chain complex?

Let's consider an homotopy simplicial chain complex, that is a functor of $\infty$-categories $X_{\bullet} = \textrm{N}(\Delta^{op}) \to \mathcal{C}_{\ge 0}$, where $\mathcal{C}_{\ge 0}$ is the $\...
Andrea Marino's user avatar
9 votes
1 answer
615 views

Any news about equivalences of periodic triangulated or $\infty$-categories?

There is a very old question (October 2009) Equivalence of derived categories which is not Fourier-Mukai which has been bumped by improving links to the literature in one of the answers and attracted ...
მამუკა ჯიბლაძე's user avatar
29 votes
1 answer
4k views

Why stable $\infty$-categories?

I begin by saying that while I understand what a triangulated / derived category is pretty well, I know nothing about Higher Algebra stuff and not even $\infty$-categories. I've heard some people say ...
Gabriel's user avatar
  • 711
11 votes
2 answers
470 views

Is the $\infty$-category $N_{dg}(\mathrm{Ch}(\mathcal{A}))$ presentable?

(See Jacob Lurie's "Higher Algebra", section 1.3.5 for context.) Let $\mathcal{A}$ be a Grothendieck abelian category. Then the stable $\infty$-category $\mathcal{D}(\mathcal{A})$ is a ...
Marco's user avatar
  • 111
10 votes
1 answer
1k views

Functorial kernel in derived category

By the work of Verdier, we know that cones in a triangulated category $\mathcal{T}$ are functorial if and only if $\mathcal{T}$ is semisimple abelian. However, in these notes, it is said that In the ...
curious math guy's user avatar
9 votes
1 answer
683 views

Two $\infty$-categories of chain complexes

In the literature, I've mostly seen two quasicategories coming from $\text{Ch}_R$: By considering $\text{Ch}_R$ with weak equivalences $\mathcal W = \text{quasi-isomorphisms}$, we can consider its ...
Daniel Teixeira's user avatar
3 votes
0 answers
332 views

$E_{\infty}$-algebras à la Lurie

Let $D(\mathbb{F}_p)$ and $\mathcal{D}(\mathbb{F}_p)$ be the derived category and derived infinity-category of cochain complexes of $\mathbb{F}_p$-vector spaces. If $A$ is a sheaf of cdgas over $\...
V.A. Vicoji's user avatar
1 vote
2 answers
723 views

On the link between homology and homotopy

In the last semester I learned homological algebra and higher category theory/homotopy theory. But I am kind of confused when I try to really understand the link between the two subjects (this is ...
Amos Kaminski's user avatar
4 votes
0 answers
104 views

Adjunctions between $\mathcal{A}_{\infty}$-categories

Is there a theory of homotopy coherent adjunctions between $\mathcal{A}_{\infty}$-categories? By this I mean at least a definition of what an adjunction is and a construction of the corresponding ...
user11267981's user avatar
2 votes
0 answers
303 views

L-infinity algebra of deformations of an L-infinity algebra?

From Schlessinger-Stasheff we know that a deformation problem should come with an associated $L_\infty$-algebra, so that gauge-equivalence classes of solutions to its Maurer-Cartan equation (the "MC ...
AlexArvanitakis's user avatar
6 votes
0 answers
148 views

Hochschild cohomology of the $A_\infty$-category of paths

I would like to describe the Hochschild cohomology (in the sense of $A_\infty$-categories) of the following $A_\infty$-category associated to a topological space $X$: It has points of $X$ as objects. ...
user11267981's user avatar
2 votes
0 answers
239 views

Reference Request: A "Chevalley-Eilenberg"-style formulation of the $L_\infty$ algebra minimal model theorem?

The nicest definition of $L_\infty$-algebras ---which I will call a "Chevalley-Eilenberg" style definition after the obvious analogy with the Chevalley-Eilenberg differential of Lie algebras--- is the ...
AlexArvanitakis's user avatar
8 votes
1 answer
615 views

Functorial construction of ("pre"-)spectral sequences? (Or - what is the "higher structure" underlying spectral sequences?)

Let $\mathcal{C}$ be a stable $\infty$-category. Let $Fun(\mathbb{Z},\mathcal{C})$ be the category of sequences of objects in $\mathcal{C}$. Where the category $\mathbb{Z}$ stands for the nerve of the ...
Saal Hardali's user avatar
  • 7,789
9 votes
0 answers
506 views

Categorification of definitions in the context of the derived category of quasi-coherent sheaves

Let $SpecA=X$ be an affine noetherian scheme. Let $QCoh(X)$ denote the derived (stable $\infty$-)category of quasi-coherent sheaves on $X$. There are the following special full subcategories spanned ...
Saal Hardali's user avatar
  • 7,789
4 votes
0 answers
86 views

BV on cyclic cohomology

Suppose that A is an associative algebra, but not Frobenius. Does the Cyclic Cohomology of A have a structure of a BV algebra? All results I could find first identify A with its dual but I am asking ...
Vladimir Baranovsky's user avatar
5 votes
1 answer
552 views

Defining hom spaces in the derived category as limits of hom spaces in the homotopy category

Let $C$ be an abelian category and $K(C)$ the homotopy category of complexes in $C$. I've seen the following claimed in several sources (without proof): A. The following isomorphisms hold: $$\...
Saal Hardali's user avatar
  • 7,789
10 votes
5 answers
1k views

Why are quasi-isomorphisms of homotopy algebras only defined for arity 1?

When reading about homotopy algebras (e.g. $L_\infty$-algebras, $A_\infty$-algebras), an $\infty$-morphism $f$ is called an $\infty$-quasi-isomorphism if $f_1$ is a quasi-isomorphism. Recall/Example (...
Marcel Rubió's user avatar
13 votes
2 answers
2k views

teaching higher algebra

Has anyone ever (successfully or unsuccessfully) taught a course in higher algebra (in the $\infty$-categorical sense)? I'm asking out of curiosity (and also hoping for more resources). The kind of ...
pro's user avatar
  • 534
5 votes
1 answer
915 views

Doing some homological algebra in triangulated categories

It's well known that chain complexes are an abelian category, and in particular we can consider chain complexes of chain complexes, i.e. double complexes. Given a double complex $A^{\bullet\bullet} \...
Dan Petersen's user avatar
  • 40.2k
9 votes
1 answer
584 views

Is there an $(\infty,2)$-category with morphisms given by $D^b\text{Coh}$?

My question is: Has anyone constructed an $(\infty,2)$-category whose objects are (projective, maybe smooth, ...) varieties, and where the 1-morphisms from $X$ to $Y$ are given by $D^b_\infty\text{...
Nathaniel Bottman's user avatar
4 votes
0 answers
685 views

Unbounded derived category that is not left-complete

Let me first recall some definition: Let $A$ be a Grothendieck Abelian category. Then, then category $\mathrm{Ch}(A)$ (I am using homological indexing) admits a combinatorial model structure (see for ...
QcH's user avatar
  • 805
23 votes
3 answers
4k views

how to make the category of chain complexes into an $\infty$-category

I'd like to have some simple examples of quasi-categories to understand better some concepts and one of the most basic (for me) should be the category of chain complexes. Has anyone ever written down ...
Yosemite Sam's user avatar
  • 1,889