Werner Hoffmann
Published 2008-08-29Version 1
We rewrite Arthur's asymptotic formula for weighted orbital integrals on real groups with the aid of a residue calculus and extend the resulting formula to the Schwartz space. Then we extract the available information about the coefficients in the decomposition of the Fourier transforms of Arthur's invariant distributions I_M(\gamma) in terms of standard solutions of the pertinent holonomic system of differential equations. This allows us to determine some of those coefficients explicitly. Finally, we prove descent formulas for those differential equations, for their standard solutions and for the aforementioned coefficients, which reduce each of them to the case that \gamma is elliptic in M.
On certain identities between Fourier transforms of weighted orbital integrals on infinitesimal symmetric spaces of Guo-Jacquet
Differential equations and the algebra of confluent spherical functions on semisimple Lie groups
A local trace formula for $p$-adic infinitesimal symmetric spaces: the case of Guo-Jacquet
![QR code for arXiv:0808.4144 [math.RT]](http://oss.arxitics.com/images/favicon.svg)