Table of Contents

• Frontmatter, pg. i
• Contents, pg. v
• §1. Introduction, pg. 1
• §2. Algebraic Preliminaries, pg. 10
• §3. The Geometry of χ : Preliminaries, pg. 20
• §4. A Metric Definition of the Maximal Boundary, pg. 31
• §5. Polar Parts, pg. 35
• §6. A Basic Inequality, pg. 44
• §7. Geometry of Neighboring Flats, pg. 52
• §8. Density Properties of Discrete Subgroups, pg. 62
• §8. Density Properties of Discrete Subgroups, pg. 66
• § 10. Pseudo Isometries of Simply Connected Spaces with Negative Curvature, pg. 71
• §11. Polar Regular Elements in Co-Compact Γ, pg. 76
• § 12. Pseudo-Isometric Invariance of Semi-Simple and Unipotent Elements, pg. 80
• §13. The Basic Approximation, pg. 96
• §14. The Map ∅̅, pg. 103
• §15. The Boundary Map ∅0, pg. 107
• §16. Tits Geometries, pg. 120
• §17. Rigidity for R-rank > 1, pg. 125
• §18. The Restriction to Simple Groups, pg. 128
• §19. Spaces of R-rank 1, pg. 134
• §20. The Boundary Semi-Metric, pg. 142
• §21. Quasi-Conformal Mappings Over K and Absolute Continuity on Almost All R-Circles, pg. 156
• §22. The Effect of Ergodicity, pg. 169
• §23. R-Rank 1 Rigidity Proof Concluded, pg. 180
• §24. Concluding Remarks, pg. 187
• Bibliography, pg. 193
• Backmatter, pg. 197