One algebra of double cosets for a general linear group over a finite field
Abstract
Let Fq be finite field with q elements. Let α≤slant n be positive integers. Consider the general linear group GL(α+n, Fq) and its subgroup H(n), which fixes the first α basis elements in Fqα+n. Denote An by the convolution algebra of H(n)-biinvariant functions on GL(α+n, Fq) . We describe algebras An in terms of generators and relations and show that the family An admits a natural interpolation to arbitrary complex n (the field Fq and α are fixed).
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