Real Spectrum Compactifications of Universal Geometric Spaces over Character Varieties

Abstract

We construct universal geometric spaces over the real spectrum compactification RSp of the character variety of a finitely generated group in SLn, providing geometric interpretations of boundary points. For an algebraic set Y(R) on which SLn(R) acts by algebraic automorphisms (such as Pn-1(R) or an algebraic cover of the symmetric space of SLn(R)), the projection map × Y → extends to a -equivariant continuous surjection ( × Y)RSp → RSp. The fibers of this extended map are homeomorphic to the Archimedean spectrum of Y(F) for some real closed field F, which is a locally compact subset of YRSp. The Archimedean spectrum is naturally homeomorphic to the real analytification, and we use this identification to compute the image of the fibers in their Berkovich analytification. For Y=P1, the image is a real subtree.