A Characterization of the Common Multiples of the Degrees of the Absolutely Irreducible Representations of a Semisimple Algebra and Applications

We characterize varieties of P.I. algebras with bounded multiplicities of the cocharacters: a variety is such if and only if it does not contain the upper triangular 2 × 2 matrices. This also yields a characterization of the varieties with bounded colength.

## Bbstruct. A closed formula for the decomposition of the GONECK&& product of two irreducible representations of BU(n) (n 2: 2) in a direct sum of such representations is given. The basis of the proof is the rule of LITTLEWOOD.

In this paper we examine some narrowness conditions for Lie algebras over a field F of characteristic zero. In particular we show that the natural analogs of the main coclass conjectures for p-groups hold in the context of ‫-ގ‬graded Lie algebras L which are generated by their first homogeneous comp

The Block algebra L referred to here is the Lie algebra over a field F of Ä Ž . ÄŽ .44 characteristic 0 with basis e N r, s g Z = Z \_ 0, 0 and subject to the comr, s w x Ž . mutation relations e , e s rk y sh e . Let 0, 1 / q g F. The q-form h, k r, s h qr, kqs Ž . Ä Ž . Ž . ÄŽ .44 L q of L is the