Relative invariants for representations 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

Let G be a reductive complex algebraic group and V a finite-dimensional G-module. be restriction, where D(O(V ) G ) denotes the differential operators on O(V ) G . Much attention of late has been given to the study of Im ρ and Ker ρ. Less well studied are properties of B itself. For example: • Wha

Motivated by the theories of Hecke algebras and Schur algebras, we consider in this paper the algebra ‫ރ‬ M G of G-invariants of a finite monoid M with unit group G. If M is a regular ''balanced'' monoid, we show that ‫ރ‬ M G is a quasi-hereditary algebra. In such a case, we find the blocks of ‫ރ‬ M