D\'eveloppement fin de la contribution unipotente \`a la formule des traces sur un corps global de caract\'eristique p>0, I

Abstract

For a field F and a connected reductive group G defined over F, we develop a theory of Kempf-Rousseau-Hesselink unipotent F-strata in G(F) that should allow us to attack open problems in positive characteristic. As an application, we use this theory to establish the fine expansion of the unipotent contribution to the (non-twisted) trace formula over a global field of characteristic p>0. The unipotent F-strata play here the role of the unipotent geometric orbits in Arthur's work over a number field. The expansion in terms of products of local distributions is not discussed here; it will be the subject of further work.

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