Here are some papers that are suggested for the end of semester presentations.

1. Saul Schleimer. Polynomial-time word problems, arXiv. One can restrict attention to the proof of Theorem 5.2.
2. Show that every (2k)-regular (possibly infinite) connected graph is a Schreier graph of a free group of rank k
3. Pierre Gillibert. The finiteness problem for automaton semigroups is undecidable, arXiv
4. Will Dison, Tim Riley. Hydra groups, arXiv
5. Rostislav Grigorchuk, Zoran Sunik. Asymptotic aspects of Schreier graphs and Hanoi Towers groups, arXiv
6. Benson Farb. Automatic Groups: A Guided Tour, PS
7. Jose Burillo, Murray Elder. Metric properties of Baumslag-Solitar groups, arXiv
8. Heather Armstrong, Bradley Forrest, Karen Vogtmann. A presentation for Aut(F_n), arXiv
9. Ievgen Bondarenko, Tullio Ceccherini-Silberstein, Alfredo Donno, Volodymyr Nekrashevych. On a family of Schreier graphs of intermediate growth associated with a self-similar group, arXiv
10. Sorry - this is a repetition Heather Armstrong, Bradley Forrest, Karen Vogtmann. A presentation for Aut(F_n), arXiv
11. Ruth Charney. An introduction to right-angled Artin groups, arXiv
12. Susan Hermiller. Rewriting Systems for Coxeter Groups, link
13. Kai-Uwe Bux, Rodrigo Perez. On the growth of iterated monodromy groups, arXiv
14. Introduction to Mapping Class Groups from Benson Farb, Dan Margalit. A Primer on Mapping Class Groups.

Updated: December 31st, 1969
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