Arielle Leitner (Technion)
Limits of the Diagonal Cartan Subgroup in SL(n,R) and SL(n, Q_p) (25/10/2017)

A conjugacy limit group is the limit of a sequence of conjugates of the positive diagonal Cartan

subgroup, C of SL(n) in the Chabauty topology.   Over R, the group C is naturally associated to a projective n-1 simplex.  We can compute the conjugacy limits of C by collapsing the n-1 simplex in different ways.  In low dimensions, we enumerate all possible ways of doing this.  In higher dimensions, we show there are infinitely many non-conjugate limits of C. 

 

In the Q_p case, SL(n) has an associated p+1 regular affine building.  (We'll give a gentle introduction to buildings in the talk).  The group C stabilizes an apartment in this building, and limits are contained in the parabolic subgroups stabilizing the facets in the spherical building at infinity. There is a strong interplay between the conjugacy limit groups and the geometry of the building, which we exploit to extend some of the results above.  The Q_p part is joint work in progress with Corina Ciobotaru.