I am learning hyperbolic geometry on my own. Recently, I have completed the book "Fuchsian Groups" by Svetlana Katok. Also, I have background in Lee's three books on manifolds and Riemann surfaces by S. Donaldson. Now I am interested in learning more advanced hyperbolic geometry such as Teichmuller Theory (earthquake theorem), 3-manifolds etc., i.e. $\textbf{the relation geometry of 3-dimensional hyperbolic and anti-de Sitter manifolds}$, and $\textbf{the relations between 3-dimensional geometry and Teichmüller theory}$. I believe that to learn the early mentioned topics I need to find an advisor. But, as of now, I am planning to learn those on my own. But I am little bit confused about how I should learn this. Here, I am listing some books which I want to learn/ study on my own. Also, I believe that in the list following list there are some books which are on dynamical aspects of hyperbolic geometry (such as, Margulis space time, geometry of crooked plane, etc) This books are as follows.
1. The Geometry of Discrete Groups by A. Beardon.
2. Automorphisms of surfaces after Nielsen and Thurston by Casson and Bleiler.
3. Teichmüller theory I by Hubbard.
4. Teichmüller theory II by Hubbard
5. Univalent Functions and Teichmüller Spaces by O. Lehto.
6. A Primer on Mapping Class Groups" by Farb and Margalit.
7. Hyperbolic Manifolds and Kleinian Groups by Katsuhiko Matsuzaki and Masahiko Taniguchi
8. An Introduction to Geometric Topology by Bruno Martelli
9. The geometry and topology of three-manifolds by William Thurston
I know I am writing for a long reading project. But I want to start this as much as I can. Above I have mentioned some books for hyperbolic geometry. But I don't know how to read those in order. Moreover, I feel that those books are not in right orders. Please advise me how to study those books in orders. Also, it will be very nice if you advise me for a learning roadmap for hyperbolic geometry toward the topics such as the relation geometry of 3-dimensional hyperbolic and anti-de Sitter manifolds and the relations between 3-dimensional geometry and Teichmüller theory.
Please advise me. Thanking in advanced.