Permutation groups containing infinite linear groups and reducts of infinite dimensional linear spaces over the two element field

Abstract

Let F2ω denote the countably infinite dimensional vector space over the two element field and GL(ω, 2) its automorphism group. Moreover, let Sym(F2ω) denote the symmetric group acting on the elements of F2ω. It is shown that there are exactly four closed subgroups, G, such that GL(ω, 2)≤ G≤ Sym(F2ω). As F2ω is an ω-categorical (and homogeneous) structure, these groups correspond to the first order definable reducts of F2ω. These reducts are also analyzed. In the last section the closed groups containing the infinite symplectic group Sp(ω, 2) are classified.