The permutation action of finite symplectic groups of odd characteristic on their standard modules

Abstract

Motivated by the incidence problems between points and flats of a symplectic polar space, we study a large class of submodules of the space of functions on the standard module of a finite symplectic group of odd characteristic. Our structure results on this class of submodules allow us to determine the p-ranks of the incidence matrices between points and flats of the symplectic polar space. In particular, we give an explicit formula for the p-rank of the generalized quadrangle W(3,q), where q is an odd prime power. Combined with the earlier results of Sastry and Sin on the 2-rank of W(3,2t), it completes the determination of the p-ranks of W(3,q).

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