Radical ∗-doubles of finite-dimensional algebras

Let H denote a finite-dimensional Hopf algebra with antipode S over a field ‫މ‬ -. w We give a new proof of the fact, due to Oberst and Schneider Manuscripta Math. 8 Ž . x 1973 , 217᎐241 , that H is a symmetric algebra if and only if H is unimodular and S 2 is inner. If H is involutory and not sem

We prove that if A is a non-associative algebra over the field of real numbers, if 5 5 5 5 5 5 5 5 there is a norm и on A satisfying xy s x y for all x, y in A, and if every one-generated subalgebra of A is finite-dimensional, then A is finite-dimensional.

Let D ω (G) be the twisted quantum double of a finite group, G, where ω ∈ Z 3 (G, C \* ). For each n ∈ N, there exists an ω such that D(G) and D ω (E) have isomorphic fusion algebras, where G is an extraspecial 2-group with 2 2n+1 elements, and E is an elementary abelian group with |E| = |G|.