Auteurs : Zakharevich, Inna (Auteur de la conférence)
CIRM (Editeur )
Résumé :
For a geometry $X$ (such as Euclidean, spherical, or hyperbolic) with isometry group $G$ the scissors congruence group $\mathcal{P}(X, G)$ is defined to be the free abelian group generated by polytopes in $X$, modulo the relation that for polytopes $P$ and $Q$ that intersect only on the boundary, $[P \cup Q]=[P]+[Q]$, and for $g \in G,[P]=[g \cdot P]$. This group classifies polytopes up to 'scissors congruence', i.e. cutting up into pieces, rearranging the pieces, and gluing them back together. With some basic group homology one can see that $\mathcal{P}(X, G) \cong H_0(G, \mathcal{P}(X, 1))$. Using combinatorial $K$-theory $\mathcal{P}(X, G)$ can be expressed as the $K_0$ of a spectrum $K(X, G)$. In this talk we will generalize this formula to show that, in fact, $K(X, G) \simeq K(X, 1)_{h G}$, and in fact more generally that this is true for any assembler with a $G$-action.This is joint work with Anna Marie Bohmann, Teena Gerhardt, Cary Malkiewich, and Mona Merling.
Mots-Clés : K-theory; scissors congruence; homotopy orbits
Codes MSC :
19D55
- $K$-theory and homology; cyclic homology and cohomology, See also {18G60}
19E99
- None of the above but in this section
55N99
- None of the above but in this section
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Informations sur la Rencontre
Nom de la Rencontre : Chromatic Homotopy, K-Theory and Functors / Homotopie chromatique, K-théorie et foncteurs Organisateurs de la Rencontre : Ausoni, Christian ; Hess Bellwald, Kathryn ; Powell, Geoffrey ; Touzé, Antoine ; Vespa, Christine Dates : 23/01/2023 - 27/01/2023
Année de la rencontre : 2023
URL de la Rencontre : https://conferences.cirm-math.fr/2339.html
DOI : 10.24350/CIRM.V.19998803
Citer cette vidéo:
Zakharevich, Inna (2023). Coinvariants, assembler K-theory, and scissors congruence. CIRM. Audiovisual resource. doi:10.24350/CIRM.V.19998803
URI : http://dx.doi.org/10.24350/CIRM.V.19998803
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