Quasi-permutation Representations of the Group GL2(q)

## Abstract We construct new two variable models of the irreducible __p__, __q__‐representations of the four dimensional complex Lie algebra __gl__(2). These models are formed in terms of __p__, __q__ ‐derivative operator and dilation operators. The __p__, __q__‐Mellin integral transformation is de

We define the new algebra. This algebra has a parameter q. The defining relations of this algebra at q s 1 coincide with the basic relations of the alternating group. We also give the new subalgebra of the Hecke algebra of type A which is isomorphic to this algebra. This algebra is free of rank half

If G is a group, H a subgroup of G, and ⍀ a transitive G-set we ask under what Ž < <. conditions one can guarantee that H has a regular orbit s of size H on ⍀. Ž . Ž . Here we prove that if PSL n, q : G : PGL n, q and H is cyclic then H has a Ž . regular orbit in every non-trivial G-set with few ex

Let M be a smooth manifold and Diff 0 (M) the group of all smooth diffeomorphisms on M with compact support. Our main subject in this paper concerns the existence of certain quasi-invariant measures on groups of diffeomorphisms, and the denseness of C . -vectors for a given unitary representation U

Let A be an abelian variety of GL 2 -type over the rational number field Q, without complex multiplication. In this paper, we will show that a modularity of A over the complex number field C implies that of A over Q.