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3 votes
1 answer
238 views

Steenrod operations on classifying spaces

Steenrod operations can be defined for all finite characteristics $p$. The simplest one, when $p=2$, is the Steenrod square. I wonder if the computation for classifying spaces for classical Lie groups ...
UVIR's user avatar
  • 803
1 vote
1 answer
438 views

Categories associated to digraphs

Let's take a directed graph, or a digraph, $G=(V,E)$ given by a finite set of vertices $V$ and a finite set of edges $E$. We can assume that pairs of vertices can have parallel edges between them and ...
Henri Riihimäki's user avatar
13 votes
1 answer
853 views

Applications of equivariant homotopy theory to representation theory

Equivariant homotopy theory focuses on spaces together with some group action on them. Jeroen van der Meer and Richard Wong have a paper where they use equivariant methods to compute the Picard group ...
Logan Hyslop's user avatar
7 votes
1 answer
292 views

Homotopy fixed points of involutive automorphisms of discrete groups

$\DeclareMathOperator\Map{Map}$Precis: I am looking for a reference/explanation of a (general) computation of homotopy fixed points $(BG)^{h\Gamma}$ of a finite group $\Gamma$ acting on a discrete (...
rvk's user avatar
  • 563
8 votes
1 answer
513 views

Equivariant (co)homology of flag manifolds, convolution algebra and nil hecke algebra?

For a complex reductive group $G$ and its Borel subgroup $B$, it seems to be well-known that the equivariant homology group $H^G_*(G/B\times G/B)$ forms a nil-Heck algebra $$NH=\Bbbk[y_i,\partial_{j}]...
Cubic Bear's user avatar
5 votes
2 answers
2k views

Canonical reference for Chern characteristic classes

I'm a little uncertain about the definitions for Chern roots Chern classes Chern characters From perusing several discussions, I gather that if one correlates the nomenclature with that of ...
Tom Copeland's user avatar
  • 10.5k
9 votes
3 answers
2k views

Borel's presentation for the cohomology of a Flag Variety

If $G$ is a simple complex Lie group, $T\subset B\subset G$ is a choice of Borel and maximal torus, and $W$ is the Weyl group, then 1) $H^{*}(G/B,K)=K[T^{\vee}]/(K[T^\vee]^W_{+})$ and 2) $K[T^\vee]^...
DCT's user avatar
  • 1,537
8 votes
0 answers
134 views

Rational homotopy type of Hilbert scheme components

What is known about rational homotopy type of irreducible component of $Hilb^n(\mathbb C^k)$ containing configuration space? I've searched arXiv for a while and found nothing but surmise that Betti ...
Denis T's user avatar
  • 4,600
5 votes
1 answer
362 views

Reference for Mackey functors with group value inverted

I'm looking for a reference for the decomposition of the category of Mackey functors for a finite group when the order of the group is inverted. (There is also an analogous decomposition for the ...
Akhil Mathew's user avatar
  • 25.6k
4 votes
1 answer
193 views

Decomposition of $\Gamma$-modules into simple objects

Let $\Gamma$ be the category of finite pointed sets. The abelian category $\mathrm{Mod-}\Gamma$ is the category of functors $\Gamma^{\mathrm{op}} \to \mathrm{Vect}_k$, where $k$ is a field (see ...
HeinrichD's user avatar
  • 5,482
10 votes
1 answer
389 views

Operads and the Stable Module Category

I am seeking references to places where operads and their algebras have been studied for the stable module category. Colored operads are fine too. Let $k$ be a field and $R$ a $k$-algebra. The stable ...
David White's user avatar
  • 30.3k
6 votes
0 answers
455 views

Cohomology of Bott-Samelson varieties?

How is the cohomology of Bott-Samelson varieties (desingularizations of Schubert Varieties ) usually calculated? Let's fix the Lie group to be $GL_n(\mathbb{C})$ or $SL_n(\mathbb{C})$ here. Is there ...
Qiao's user avatar
  • 1,719
18 votes
2 answers
2k views

Virasoro action on the elliptic cohomology

I'm trying to understand better the mathematical notion of elliptic cohomology. Note that I only know the physics definition of the elliptic genus given in Witten's paper. Let $X$ be a Calabi-Yau ...
Yuji Tachikawa's user avatar
10 votes
2 answers
896 views

Applications of classifying thick subcategories

So, relatively recently, Balmer introduced this notion of a spectrum for a tensor triangulated category and used it to prove a generalization of a classification theorem done in several areas of ...
Dylan Wilson's user avatar
  • 13.5k