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This tag is used if a reference is needed in a paper or textbook on a specific result.
9
votes
1
answer
319
views
Weyl map for $SU(n)$
Let $G= SU(n)$ and let $\mathbb{T}$ be the maximal torus in $G$ given by diagonal matrices. We have
$$
H^*(G,\mathbb{Q}) \cong \Lambda_{\mathbb{Q}}[x_3, x_5, \dots, x_{2n-1}] \ .
$$
Now consider the …
4
votes
Reference: Learning noncommutative geometry and C^* algebras
Let me add some new-ish books to the mix that I liked and deal with some topics in $C^*$-algebras that have picked up some steam in recent years:
If you want an introduction to the state of the art …
4
votes
1
answer
247
views
reference request for essential equivalence of top. groupoids
Let $G$ and $H$ be two topological groupoids. Recall that a morphism $F \colon H \to G$ is called an essential equivalence, if
the map $t \circ \pi_1 \colon G_1 \times_{G_0} H_0 \to G_0$ is an open …
6
votes
Literature on "real" $C^*$-algebras
There is a book by Herbert Schröder called "K-Theory for Real C*-algebras and Applications", which can be found on mathscinet and has a Google Books entry (sadly without preview).
6
votes
Accepted
K-group properties of quasi-diagonal $C^*$-algebras
This is not necessarily an answer, but it was too long for a comment:
Note that for any separable unital $C^*$-algebra $A$ its suspension $SA := C_0(\mathbb{R}) \otimes A$ is quasidiagonal. This can …
5
votes
Morphisms between $K_0$
In the world of $C^*$-algebras, there are cases, where a homomorphism $f \colon K_0(A) \to K_0(B)$ is induced not only by a bimodule, but by an honest $*$-homomorphism. For example, if $A$ is a separa …
3
votes
topological monoid from symmetric monoidal category
My reference for this is now Corollary 11.7 in J. P. May. The geometry of iterated loop spaces. Springer-Verlag, Berlin, 1972. Lectures Notes in Mathematics, Vol. 271.
11
votes
2
answers
1k
views
topological monoid from symmetric monoidal category
What is the standard reference for the fact that the classifying space of a strict monoidal category is a topological monoid with respect to the operation induced by the tensor product?
EDIT: The fir …
5
votes
0
answers
105
views
Classifying spaces of crossed modules
Let $\mathcal{G}$ be a strict topological $2$-group, i.e. a strict $2$-category with a single object, a space of invertible $1$-morphisms, a space of invertible $2$-morphisms and continuous structure …