Congruences of parahoric group schemes
Abstract
Let F be a non-archimedean local field and let T be a torus over F. With NR denoting the N\'eron-Raynaud model of T, a result of Chai and Yu asserts that the model NR ×_F F/Fm is canonically determined by (l(F), ) for l>>m, where l(F) = (F/Fl, F/Fl+1, ε) with ε denoting the natural projection of F/Fl+1 on F/Fl, and :=X*(T). In this article we prove an analogous result for parahoric group schemes attached to facets in the Bruhat-Tits building of a connected reductive group over F.
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