G-compactifications – That Can't Be Right

May 6, 2024May 6, 2024

Extending the bump function of irregular geodesic rays to the Karpelevich compactification

In this very short post, we look at the properties of a certain bump function of the collection of all geodesic rays emanating from a fixed point $x_0\in X$ towards irregular points on the geodesic boundary $\partial X$ of a non-compact symmetric space

August 8, 2023April 25, 2024

Karpelevich’s compactification and extensions of Poisson integrals

In this short blog post, we study to what extent the Poisson integral of continuous functions on the Furstenberg boundary ${G/P_0}$ of a symmetric space of non-compact type can be extended continuously to the whole Karpelevich boundary or what parts thereof it can be extended. The interest in such integrals comes from the fact that the Poisson integrals of functions in ${L^{\infty}(G/P_0)}$ exhaust all bounded harmonic functions on ${X}$ , a deep result of Furstenberg. The study of such extensions hence has its origins in classical harmonic analysis and solutions to Dirichlet problems on the Poincare disk.