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--- amenability [2019/10/04 15:06]
d.gromada
+++ amenability [2021/11/23 11:56] (current)
@@ Line 24: / Line 24: @@
 ==== Stability results ====
-If a discrete quantum group $\Gamma$ is amenable than every its quantum subgroup is amenable. [(ref:Cra17)]
+  * If $H_1$ and $H_2$ are co-amenable, then $H_1\times H_2$ is co-amenable. (Proof: Denote by $h_1$ and $h_2$ the Haar states and by $\epsilon_1$ and $\epsilon_2$ the counits defined on $C(H_1)$ resp. $C(H_2)$. Take $A:=C(H_1)\otimes_{\rm min}C(H_2)$. We check that $\epsilon:=\epsilon_1\otimes\epsilon_2$ is a counit of $H_1\times H_2$ and $h:=h_1\otimes h_2$ is the Haar state of $H_1\times H_2$. From [(ref:Avi82)] (Appendix) it follows that $h$ is faithful on $A$.)
+  * If a discrete quantum group $\Gamma$ is amenable than every its quantum subgroup $\Lambda$ is amenable (we have $C^*(\Lambda)\subset C^*(\Gamma)$, hence if $h$ is faithful on $C^*(\Gamma)$ then it is faithful also on $C^*(\Lambda)$). Moreover, $\Gamma$ is amenable if and only if $\Lambda$ is amenable and $\Gamma$ acts amenably on the homogeneous space $\Gamma/\Lambda$. [(ref:Cra17)]
 ==== Examples ====
-  * $O_F^+$ for $F\in\GL(2,\C)$ (in particular $\widehat{\mathrm{SU}}_q(2)$) [(ref:Ban97)]
+  * $\hat O_F^+$ for $F\in\GL(2,\C)$ (in particular $\widehat{\mathrm{SU}}_q(2)$) [(ref:Ban97)]
-  * Quantum automorphism group of four-dimensional C*-algebras (in particular $S_4^+$) [(ref:Ban99b)]
+  * Dual of quantum automorphism group of four-dimensional C*-algebras (in particular $\hat S_4^+$) [(ref:Ban99b)]
-  * $O_N^*$ [(ref:BV10)]
+  * $\hat O_N^*$ [(ref:BV10)]
   * Any finite quantum group
   * Any Abelian quantum group (i.e. a dual of a compact group)
@@ Line 37: / Line 39: @@
   * $\hat O_F^+$ for $F\in\GL(N,\C)$ (in particular $\hat O_N^+$) for $N>2$ [(ref:Ban97)]
-  * Quantum automorphism group of $N$-dimensional C*-algebras for $N>4$ (in particular $S_N^+$) [(ref:Ban99b)]
+  * $\hat U_F^+$ for $F$ arbitrary [(ref:Ban97)]
+  * Dual of quantum automorphism group of $N$-dimensional C*-algebras for $N>4$ (in particular $\hat S_N^+$) [(ref:Ban99b)]
   * Any countable discrete group containing a free subgroup on two generators
@@ Line 44: / Line 47: @@
 If $\Gamma=\hat G$ is an amenable discrete quantum group then
   * $C_{\rm u}(G)$ and $C_{\rm r}(G)$ are [[wp>Nuclear C*-algebra|nuclear]] [(ref:BT03)]
-  * $L^\infty(G)$ is [[wp>>Von_Neumann_algebra#Amenable_von_Neumann_algebras|injective]] [(ref:BT03)]
+  * $L^\infty(G)$ is [[wp>Von_Neumann_algebra#Amenable_von_Neumann_algebras|injective]] [(ref:BT03)]
+  * $\Gamma$ has the [[Haagerup property]] [(ref:DFSW13)]
 A discrete quantum group $\Gamma=\hat G$ is amenable if
@@ Line 123: / Line 127: @@
 url       : https://doi.org/10.1090/proc/13365
 )]
+[(ref:DFSW13>>
+author    : Matthew Daws, Pierre Fima, Adam Skalski, Stuart White
+title     : The Haagerup property for locally compact quantum groups
+journal   : Journal für die reine und angewandte Mathematik
+volume    : 2016
+number    : 711
+pages     : 189–229
+year      : 2013
+doi       : 10.1515/crelle-2013-0113
+url       : https://doi.org/10.1515/crelle-2013-0113
+)]
+[(ref:Avi82>>
+ url      : http://www.jstor.org/stable/1998890
+ author   : Daniel Avitzour
+ journal  : Transactions of the American Mathematical Society
+ number   : 2
+ pages    : 423--435
+ title    : Free Products of C*-Algebras
+ volume   : 271
+ year     : 1982
+}
+)]
 ~~REFNOTES ref ~~

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