Une mesure de Radon invariante sur les F-strates unipotentes

Abstract

Let F be a non-Archimedean locally compact field and G a connected reductive group defined over F. To any unipotent element u in G(F), we have associated in [L] an F-stratum YF,u which is a (possibly infinite) union of unipotent G(F)-orbits. We define here a "canonical" non-zero positive G(F)-invariant Radon measure on YF,u. Under additional assumptions, we deduce the convergence of the orbital integral associated to the G(F)-orbit of u. The construction, valid in any characteristic, generalizes the one of Deligne-Ranga Rao [RR] and also applies to nilpotent strata in Lie(G)(F).

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