Real spectrum and oriented Gromov equivariant compactifications of character varieties

Abstract

The character variety of a finitely generated group in PSL2(R) has many compactifications. We construct a continuous surjection from the real spectrum compactification RSp to the oriented Gromov equivariant compactification. Our construction is based on a geometric interpretation of the elements of ∂ RSp as -actions by isometries on R-trees. We endow these R-trees with an orientation induced by the standard orientation on the circle, which we characterize by a semialgebraic equation. Moreover, we describe the -actions by orientation preserving isometries on oriented R-trees, which arise in both compactifications, as limits of -actions on the oriented hyperbolic plane, via asymptotic cones endowed with an ultralimit orientation.