Bounds on multiplicities of spherical spaces over finite fields
Abstract
Let G be a reductive group scheme of type A acting on a spherical scheme X. We prove that there exists a number C such that the multiplicity Hom(,C[X(F)]) is bounded by C, for any finite field F and any irreducible representation of G(F). We give an explicit bound for C. We conjecture that this result is true for any reductive group scheme and when F ranges (in addition) over all local fields of characteristic 0.
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