On groups of central type, non-degenerate and bijective cohomology classes

“…In [10] it is also proved that if H = {(a, φ(a) | a ∈ Fa n } is a group of I -type then the IYB group G = φ(Fa n ) naturally acts on the quotient group A = Fa n /K, where K = {a ∈ Fa n | φ(a) = 1} and one obtains a bijective associated 1-cocycle G → A with respect to this action. By a result of Etingof and Gelaki [9], this bijective 1-cocycle yields a non-degenerate 2-cocycle on the semi-direct product A G. This on its turn yields that A G is a group of central type in the sense of Ben David and Ginosar [3], i.e. a finite group H with a 2-cocycle c ∈ Z 2 (H, C * ) such that the twisted group algebra C c H is isomorphic to a full matrix algebra over the complex numbers.…”

Semigroup Algebras and Noetherian Maximal Orders: a Survey

“…In [10] it is also proved that if H = {(a, φ(a) | a ∈ Fa n } is a group of I -type then the IYB group G = φ(Fa n ) naturally acts on the quotient group A = Fa n /K, where K = {a ∈ Fa n | φ(a) = 1} and one obtains a bijective associated 1-cocycle G → A with respect to this action. By a result of Etingof and Gelaki [9], this bijective 1-cocycle yields a non-degenerate 2-cocycle on the semi-direct product A G. This on its turn yields that A G is a group of central type in the sense of Ben David and Ginosar [3], i.e. a finite group H with a 2-cocycle c ∈ Z 2 (H, C * ) such that the twisted group algebra C c H is isomorphic to a full matrix algebra over the complex numbers.…”

Semigroup Algebras and Noetherian Maximal Orders: a Survey

“…Hence, α(b 2 , c 2 , i 2 , j 2 ) = α(1, b −1 2 · c 2 , i 2 , j 2 ) (by (9), with a = b 2 ) = α(1, 1, i 2 , j 2 ) (by (7), with a = c −1 2 · b 2 ), and similarly for β(b 2 , c 2 , i 2 , j 2 ) = β(1, 1, i 2 , j 2 ). Note also that…”

“…Hence it comes as no surprise that skew left braces, whose initial motivation was also the Yang-Baxter equation, have some connections with Hopf algebras too. Some of them are their relation with triangular semisimple and cosemisimple Hopf algebras explained in [24,9], and the relation with finite dimensional pointed Hopf algebras through rack theory, explained in [1] (we clarify the connection with rack theory in Section 5). These two classes of Hopf algebras have received a lot of attention recently since they are important in the program sketched in [2, pages 376, 377] to try to obtain a classification of finite-dimensional Hopf algebras.…”

Solutions of the Yang–Baxter equation associated to skew left braces, with applications to racks

“…We call the triple (G, Z n , π) an (n-fold) I-datum 1 on the group G. It turns out that a 1-cocycle is bijective if and only if so are all the 1-cocycles in its cohomology class [4,Proposition 4.1]. The fact that bijectivity is a class property is respected by the cohomological structures in §3 and §4.…”

On groups of I-type and involutive Yang–Baxter groups