Finite dimensional Hopf algebras over the Kac–Paljutkin algebra $H 8$

Gromov introduced translation algebras (over the real or complex fields) in the early 1990’s as certain algebras of infinite matrices, whose entries are indexed by a given

In this paper we describe the Cuntz semigroup of continuous fields of C ∗ - algebras over one dimensional spaces whose fibers have stable rank one and trivial K 1 for each

Our purpose in the next result is to show that FPF rings with finite dimensional classical ring of quotients enjoy an important property first observed by Deligne: Rings of

While the preceding papers mostly considered abstract properties of algebras of quotients, our main objective is to compute Q m (L) for some Lie algebras L. Specifically, we

These criteria are now a consequence of some results obtained with the aid of the classification of finite simple groups (see [6] and [12]), which reduce the simple cases to

One can consider a Jacobi manifold as a generalized phase-space and the Lie algebra of infinitesimal automorphisms as the algebra of symmetries of this phase-space.. Then the

In this paper, we generalize the result of Swan for a finite group to a p- periodic group F of finite ved which has a finite quotient whose a p-Sylow subgroup is elementary abelian

• the study of linear groups, in which the set of all subgroups having infinite central dimension satisfies the minimal condition (a linear analogy of the Chernikov’s problem);.. •