The Blocks of Solvable Algebraic Monoids

We begin by constructing Hecke algebras for arbitrary finite regular monoids M. We then show that the semisimplicity of the complex monoid algebra ‫ރ‬ M is equivalent to the semisimplicity of the associated Hecke algebras and a condition on induced group characters. We apply these results to finite

The best results are obtained either in the general case for the first three cohomology groups, or in the case of isolated singularities for all cohomology groups, respectively.

We introduce the notion of pure Q-solvable algebra. The quantum matrices, Ž . quantum Weyl algebra, U n are the examples. It is proved that the skew field of q fractions of a pure Q-solvable algebra R is isomorphic to the skew field of twisted rational functions. This is a quantum version of the Gel

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