Irreducible Representations of Periodic Finitary Linear Groups

Very recently M. S. Lucido proved that for any prime p, a periodic finitary linear p X -group G of characteristic p is isomorphic to some finitary linear group G of 0 characteristic zero. Moreover G can be chosen to be irreducible whenever G is 0 irreducible. Here we offer an alternative proof, one

We characterize the point stabilizers and kernels of finitary permutation representations of infinite transitive groups of finitary permutations. Moreover, the number of such representations is determined.

The natural module for Y will be denoted by W. If W is irreducible as an X-module, then ␦ will denote its T -high weight. We will always X Ž . Ž . Ž . assume that Y is the smallest of SL W , SO W , Sp W containing X. To justify this assumption, we must eliminate the situation when X -Y -Ž . Ž . Ž .

Let V be a finite dimensional vector space over a field K of characteristic / 2, and b: V = V ª K a non-degenerate symmetric bilinear form. Ž . Let : G ª O b be an orthogonal representation of the finite group G. Unless mentioned otherwise, we assume throughout that is absolutely irreducible as a l