Split Orders and Convex Polytopes in Buildings

TL;DR

This paper extends the concept of split orders from 2x2 matrices to nxn matrices over local fields, providing a geometric interpretation using convex polytopes in affine buildings for $SL_n(k)$.

Contribution

It generalizes the notion of split orders to higher dimensions and establishes a correspondence with convex polytopes in affine buildings, expanding geometric understanding.

Findings

One-to-one correspondence between split orders and convex polytopes in apartments.

Generalization from $SL_2(k)$ to $SL_n(k)$ for $n>2$.

Geometric characterization of split orders in higher dimensions.

Abstract

As part of his work to develop an explicit trace formula for Hecke operators on congruence subgroups of $SL_2(\Z)$, Hijikata defines and characterizes the notion of a split order in $M_2(k)$, where $k$ is a local field. In this paper, we generalize the notion of a split order to $M_n(k)$ for $n>2$ and give a natural geometric characterization in terms of the affine building for $SL_n(k)$. In particular, we show that there is a one-to-one correspondence between split orders in $M_n(k)$ and a collection of convex polytopes in apartments of the building such that the split order is the intersection of all the maximal orders representing the vertices in the polytope. This generalizes the geometric interpretation in the $n=2$ case in which split orders correspond to geodesics in the tree for $SL_2(k)$ with the split order given as the intersection of the endpoints of the geodesic.