Universal Functions on Complex General Linear Groups

Let G be a general or special linear group over a local skew field. Then G is a Ž totally disconnected, locally compact group, to which G. Willis Math. Ann. 300, . 1994, 341᎐363 associates its scale function s : G ª ‫.ގ‬ We compute s on the subset of diagonalizable matrices. We also consider the pro

For the quantum function algebras O O M and O O GL , at lth roots of unity q n q n when l is odd, the image under the q-analog of the Frobenius morphism charac-Ž . terizes each prime and primitive ideal uniquely up to automorphisms obtained from row and column multiplication of the standard generat

We study the number of homomorphisms from a finite group to a general linear group over a finite field. In particular, we give a generating function of such numbers. Then the Rogers-Ramanujan identities are applicable.

In 1991 Dixon and Kovacs 8 showed that for each field K which has finite degree over its prime subfield there is a number d such that every K finite nilpotent irreducible linear group of degree n G 2 over K can be w x wx ' generated by d nr log n elements. Afterwards Bryant et al. 3 proved K ' d G F