Abstract
LetG=GL(m, D) whereD is a central division algebra over a commutative nonarchimedean local fieldF. LetE/F be a field extension contained inM(m, D). We denote byI (resp.I E) the nonextended affine building ofG (resp. of the centralizer ofE x inG). In this paper we prove that there exists a uniqueG E-equivariant affine mapj E∶IE→I. It is injective and its image coincides with the set ofE x-fixed points inI. Moreover, we prove thatj E is compatible with the Moy-Prasad filtrations.
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This author's contribution was written while he was a post-doctoral student at King's College London and supported by an european “TMR” grant
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Broussous, P., Lemaire, B. Building ofGL(m, D) and centralizers. Transformation Groups 7, 15–50 (2002). https://doi.org/10.1007/BF01253463
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DOI: https://doi.org/10.1007/BF01253463