# The Tits alternative for $\text{Out}\left({F}_{n}\right)$. I: Dynamics of exponentially-growing automorphisms.

Bestvina, Mladen; Feighn, Mark; Handel, Michael

Annals of Mathematics. Second Series (2000)

- Volume: 151, Issue: 2, page 517-623
- ISSN: 0003-486X

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topBestvina, Mladen, Feighn, Mark, and Handel, Michael. "The Tits alternative for . I: Dynamics of exponentially-growing automorphisms.." Annals of Mathematics. Second Series 151.2 (2000): 517-623. <http://eudml.org/doc/121772>.

@article{Bestvina2000,

author = {Bestvina, Mladen, Feighn, Mark, Handel, Michael},

journal = {Annals of Mathematics. Second Series},

keywords = {train tracks; attracting laminations; Tits alternative; outer automorphism groups; free groups; free subgroups; subgroups of finite index},

language = {eng},

number = {2},

pages = {517-623},

publisher = {Princeton University, Mathematics Department, Princeton, NJ; Mathematical Sciences Publishers, Berkeley},

title = {The Tits alternative for . I: Dynamics of exponentially-growing automorphisms.},

url = {http://eudml.org/doc/121772},

volume = {151},

year = {2000},

}

TY - JOUR

AU - Bestvina, Mladen

AU - Feighn, Mark

AU - Handel, Michael

TI - The Tits alternative for . I: Dynamics of exponentially-growing automorphisms.

JO - Annals of Mathematics. Second Series

PY - 2000

PB - Princeton University, Mathematics Department, Princeton, NJ; Mathematical Sciences Publishers, Berkeley

VL - 151

IS - 2

SP - 517

EP - 623

LA - eng

KW - train tracks; attracting laminations; Tits alternative; outer automorphism groups; free groups; free subgroups; subgroups of finite index

UR - http://eudml.org/doc/121772

ER -

## Citations in EuDML Documents

top- Benson Farb, Michael Handel, Commensurations of Out$\left({F}_{n}\right)$
- Julien Cassaigne, Pedro V. Silva, Infinite periodic points of endomorphisms over special confluent rewriting systems
- François Gautero, Combinatorial mapping-torus, branched surfaces and free group automorphisms
- Pierre Arnoux, Valérie Berthé, Arnaud Hilion, Anne Siegel, Fractal representation of the attractive lamination of an automorphism of the free group

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