Stable orbital integrals for classical Lie algebras and smooth integral models

Abstract

A main goal of this paper is to introduce a new description of the stable orbital integral for a regular semisimple element and for the unit element of the Hecke algebra in the case of gln,F, un,F, and sp2n,F, by assigning a certain stratification and then smoothening each stratum, where F is a non-Archimedean local field of any characteristic. As applications, we will provide a closed formula for the stable orbital integral for gl2,F, gl3,F, and u2,F. We will also provide a lower bound for the stable orbital integral for gln,F, un,F, and sp2n,F with all n. Finally we will propose conjectures that our lower bounds are optimal in a sense of the second leading term for gln,F and the first leading term for un,F and sp2n,F. There is a restriction about the factorization of the characteristic polynomial arising from the parabolic descent when we work with un,F and sp2n,F, whereas this assumption does not appear in gln,F case.

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