Groups GL(∞) over finite fields and multiplications of double cosets

Abstract

Let F be a finite field. Consider a direct sum V of an infinite number of copies of F, consider the dual space V, i.~e., the direct product of an infinite number of copies of F. Consider the direct sum V=V V. The object of the paper is the group GL of continuous linear operators in V. We reduce the theory of unitary representations of GL to projective representations of a certain category whose morphisms are linear relations in finite-dimensional linear spaces over F. In fact we consider a certain family Qα of subgroups in V preserving two-element flags, show that there is a natural multiplication on spaces of double cosets with respect to Qα, and reduce this multiplication to products of linear relations. We show that this group has type I and obtain an 'upper estimate' of the set of all irreducible unitary representations of GL.