On a Bruhat decomposition related to the Shalika subgroup of GL(2n)

Abstract

Let F be a non-archimedean local field or a finite field. In this article, we obtain an explicit and complete set of double coset representatives for S GL2n(F)/Q where S is the Shalika subgroup and Q a maximal parabolic subgroup of the group GL2n(F) of invertible 2n× 2n matrices. We compute the cardinality of S GL2n(F)/Q and also give an alternate perspective on the double cosets arising intrinsically from certain subgroups which are relevant for applications in representation theory. Finally, if Q is a maximal parabolic subgroup of the type (r,2n-r), we prove that S GL2n(F)/Q is in one to one correspondence with Sn S2n/Sr× S2n-r leading to a Bruhat decomposition. The results and proofs discussed in this article are valid over any arbitrary field F even though our motivation is from representation theory of p-adic and finite linear groups.

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