Extraspecial towers and Weil representations

Abstract

This paper was motivated by a remarkable group, the maximal subgroup M=S3 22+1-32+126+1- of the sporadic simple group Fi23, where S3 is the symmetric group of degree 3, and 22+1-, 32+1 and 26+1- denote extraspecial groups. The representation 32+1 GL(3,F4) GL(6,F2) extends (remarkably) to S3 22+1-32+1 and preserves a quadratic form (of minus type) which allows the construction of M. The paper describes certain (Weil) representations of extraspecial groups which extend, and preserve various forms. Incidentally, M is a remarkable solvable group with derived length 10, and composition length 24.