Fonctions dont les intégrales orbitales et celles de leurs transformées de Fourier sont à support topologiquement nilpotent

Abstract: Let $F$ be a $p$-adic field and let $G$ be a connected reductive group defined over $F$. We assume $p$ is big. Denote $\mathfrak{g}$ the Lie algebra of $G$. To each vertex $s$ of the reduced Bruhat-Tits' building of $G$, we associate as usual a reductive Lie algebra $\mathfrak{g}{s}$ defined over the residual field ${\mathbb F}{q}$. We normalize suitably a Fourier-transform $f\mapsto \hat{f}$ on $C_{c}^{\infty}(\mathfrak{g}(F))$. We study the subspace of functions $f\in C_{c}^{\infty}(\mathfrak{g}(F))$ such that the orbital integrals of $f$ and of $\hat{f}$ are $0$ for each element of $ \mathfrak{g}(F)$ which is not topologically nilpotent. This space is related to the characteristic functions of the character-sheaves on the spaces $\mathfrak{g}{s}({\mathbb F}{q})$, for each vertex $s$, which are cuspidal and with nilpotent support. We prove that our subspace behave well under endoscopy.