Unisingular subgroups of symplectic group Sp2n(2) for 2n<250

Abstract

A linear group is called unisingular if every element of it has eigenvalue 1. A certain aspect of the theory of abelian varieties requires the knowledge of unisingular irreducible subgroups of the symplectic groups over the field of two elements. A more special, but an important question is on the existence of such subgroups in the symplectic groups of particular degree. We answer this question for almost all degrees 2n<250, specifically, the question remains open only 7 values of n. Additionally, the paper contains results of general nature on the structure of unisingular irreducible linear groups.