higher_hyperoctahedral_series
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| - | For every $s\in \N$ with $s\geq 3$ the quantum groups $(H_N^{[s]})_{N\in \N}$ of the higher hyperoctahedral series with parameter $s$ are an [[easy_quantum_group|easy]] family of compact matrix quantum groups, i.e., the intertwiner spaces of their corepresentation categories are induced by a [[category of partitions]]. More precisely, it is a [[group-theoretical hyperoctahedral categories of partitions|group-theoretical hyperoctahedral category of partitions]] that induces the corepresentation categories of $(H_N^{[s]})_{N\in \N}$. Canonically, if $s<\infty$, it is generated by the set $\{\fourpart,h_s\}$ of partitions [(:ref:RaWe14)], where $h_s$ is the partition whose [[partition#word_representation|word representation]] is given by $(ab)^s$. See also [[categories of the higher hyperoctahedral series]]. The corepresentation categories of $(H_N^{[\infty]})_{N\in\N}$ are induced by $\Paabaab$. | + | For every $s\in \N$ with $s\geq 3$ the quantum groups $(H_N^{[s]})_{N\in \N}$ of the higher hyperoctahedral series with parameter $s$ are an [[easy_quantum_group|easy]] family of compact matrix quantum groups, i.e., the intertwiner spaces of their corepresentation categories are induced by a [[category of partitions]]. More precisely, it is a [[group-theoretical hyperoctahedral categories of partitions|group-theoretical hyperoctahedral category of partitions]] that induces the corepresentation categories of $(H_N^{[s]})_{N\in \N}$. Canonically, if $s<\infty$, it is generated by $h_s$ [(:ref:RaWe14)], the partition whose [[partition#word_representation|word representation]] is given by $(\mathsf{ab})^s$. See also [[categories of the higher hyperoctahedral series]]. The corepresentation categories of $(H_N^{[\infty]})_{N\in\N}$ are induced by $\Paabaab$. |
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