La variante infinit\'esimale de la formule des traces de Jacquet-Rallis pour les groupes lin\'eaires

Abstract

We establish an infinitesimal version of the Jacquet-Rallis trace formula for general linear groups. Our formula is obtained by integrating a kernel truncated a la Arthur multiplied by the absolute value of the determinant to the power s ∈ C. It has a geometric side which is a sum of distributions Io(s, ·) indexed by the invariants of the adjoint action of GLn(F) on gln+1(F) as well as a "spectral side" consisting of the Fourier transforms of the aforementioned distributions. We prove that the distributions Io(s, ·) are invariant and depend only on the choice of the Haar measure on GLn(A). For regular semi-simple classes o, Io(s, ·) is a relative orbital integral of Jacquet-Rallis. For classes o called relatively regular semi-simple, we express Io(s, ·) in terms of relative orbital integrals regularised by means of zeta functions.