A coarse geometric expansion of a variant of Arthur's truncated traces and some applications

Abstract: Let F be a global function field with constant field $\mathbb{F}q$. Let G be a reductive group over $\mathbb{F}_q$. We establish a variant of Arthur's truncated kernel for G and for its Lie algebra which generalizes Arthur's original construction. We establish a coarse geometric expansion for our variant truncation. As applications, we consider some existence and uniqueness problems of some cuspidal automorphic representations for the functions field of the projective line $\mathbb{P}^1{\mathbb{F}_q}$ with two points of ramifications.