AbstractLet Dω(G) be the twisted quantum double of a finite group, G, where ω∈Z3(G,C∗). For each n∈N, there exists an ω such that D(G) and Dω(E) have isomorphic fusion algebras, where G is an extraspecial 2-group with 22n+1 elements, and E is an elementary abelian group with |E|=|G|
summary:Let $G$ be a finite group and $H$ a subgroup. Denote by $D(G;H)$ (or $D(G)$) the crossed pro...
AbstractWe establish braided tensor equivalences among module categories over the twisted quantum do...
We consider a class of quasiHopf algebras which we call generalized twisted quantum doubles. They ar...
Let Dω(G) be the twisted quantum double of a finite group, G, where ω∈Z3(G,C∗). For each n∈N, there ...
AbstractLet Dω(G) be the twisted quantum double of a finite group, G, where ω∈Z3(G,C∗). For each n∈N...
Let Dω(G) be the twisted quantum double of a finite group, G, where ω∈Z3(G,C∗). For each n∈N, there ...
AbstractWe exhibit an isomorphism between the fusion algebra of the quantum double of an extraspecia...
We exhibit an isomorphism between the fusion algebra of the quantum double of an extraspecial p-grou...
AbstractWe exhibit an isomorphism between the fusion algebra of the quantum double of an extraspecia...
We establish braided tensor equivalences among module categories over the twisted quantum double of ...
We establish braided tensor equivalences among module categories over the twisted quantum double of ...
We investigate the representation theory and fusion rules of a class of cocentral abelian (quasi-)Ho...
AbstractWe consider a class of quasiHopf algebras which we call generalized twisted quantum doubles....
Given a pair of finite groups F,G and a normalized 3-cocycle ω of G, where F acts on G as automorphi...
summary:Let $G$ be a finite group and $H$ a subgroup. Denote by $D(G;H)$ (or $D(G)$) the crossed pro...
summary:Let $G$ be a finite group and $H$ a subgroup. Denote by $D(G;H)$ (or $D(G)$) the crossed pro...
AbstractWe establish braided tensor equivalences among module categories over the twisted quantum do...
We consider a class of quasiHopf algebras which we call generalized twisted quantum doubles. They ar...
Let Dω(G) be the twisted quantum double of a finite group, G, where ω∈Z3(G,C∗). For each n∈N, there ...
AbstractLet Dω(G) be the twisted quantum double of a finite group, G, where ω∈Z3(G,C∗). For each n∈N...
Let Dω(G) be the twisted quantum double of a finite group, G, where ω∈Z3(G,C∗). For each n∈N, there ...
AbstractWe exhibit an isomorphism between the fusion algebra of the quantum double of an extraspecia...
We exhibit an isomorphism between the fusion algebra of the quantum double of an extraspecial p-grou...
AbstractWe exhibit an isomorphism between the fusion algebra of the quantum double of an extraspecia...
We establish braided tensor equivalences among module categories over the twisted quantum double of ...
We establish braided tensor equivalences among module categories over the twisted quantum double of ...
We investigate the representation theory and fusion rules of a class of cocentral abelian (quasi-)Ho...
AbstractWe consider a class of quasiHopf algebras which we call generalized twisted quantum doubles....
Given a pair of finite groups F,G and a normalized 3-cocycle ω of G, where F acts on G as automorphi...
summary:Let $G$ be a finite group and $H$ a subgroup. Denote by $D(G;H)$ (or $D(G)$) the crossed pro...
summary:Let $G$ be a finite group and $H$ a subgroup. Denote by $D(G;H)$ (or $D(G)$) the crossed pro...
AbstractWe establish braided tensor equivalences among module categories over the twisted quantum do...
We consider a class of quasiHopf algebras which we call generalized twisted quantum doubles. They ar...
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