Some computations of cartan invariants for finite groups of lie type

We will give an algorithm for computing generators of the invariant ring for a given representation of a linearly reductive group. The algorithm basically consists of a single Gro bner basis computation. We will also show a connection between some open conjectures in commutative algebra and finding

For each simply connected semisimple algebraic group G defined and split over the prime field ‫ކ‬ , we establish a uniform bound on n above which all of the first p Ž . cohomology groups with values in the simple modules for the finite group G n are Ž . determined by those for the algebraic group G

1. Introduction 2. Preliminaries 3. The main lemma 4. The main theorem Ž . 5. Self-dual representations for GL n, F q 6. Calculation of the element s and consequences 7. Symplectic groups Ž . 8. Self-dual representations for SL n, F q Ž . 9. The counterexample for SL 6, F , q ' 3 mod 4 q 10. Referen

We show how to deduce multiplicity one theorems for cuspidal representations of finite groups of Lie type from analogous results for p-adic groups. We then look at examples where the latter is known. One such example is the restriction of Ž . Ž . w x irreducible representations of SO n to SO n y 1 S