ℝ-trees and laminations for free groups III: currents and dual ℝ-tree metrics

Lustig²

2009

Geom. Topol.

Self Cite

144

1805Geometric intersection number and analogues of the curve complex for free groups ILYA KAPOVICH MARTIN LUSTIGFor the free group F N of finite rank N 2 we construct a canonical Bonahon-type, continuous and Out.F N /-invariant geometric intersection formHere cv.F N / is the closure of unprojectivized Culler-Vogtmann Outer space cv.F N / in the equivariant Gromov-Hausdorff convergence topology (or, equivalently, in the length function topology). It is known that cv.F N / consists of all very small minimal isometric actions of F N on R-trees. The projectivization of cv.F N / provides a free group analogue of Thurston's compactification of Teichmüller space.As an application, using the intersection graph determined by the intersection form, we show that several natural analogues of the curve complex in the free group context have infinite diameter.

“…This is due to the fact that in this paper ' acts on R-trees in CV.F n / from the left, while [12] and [33] in one considers the right-action (compare the discussion in Section 2).…”

Section: Statement Of the Main Resultsmentioning

confidence: 99%

“…(3) An alternative proof (relying on the main result of [27]) for Proposition 7.7 below is given by Proposition 5.6 of [12].…”

Section: Statement Of the Main Resultsmentioning

confidence: 99%

Section: Statement Of the Main Resultsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Geometric intersection number and analogues of the curve complex for free groups

Lustig²

2009

Geom. Topol.

Self Cite

144

“…The space Curr (F ) turns out to be a natural companion of the outer space and contains additional valuable information about the geometry and dynamics of free group automorphisms. Examples of such applications can be found in [Bo3], [CouHL3], [F], [Ka3,4,5], [KaLu1], [KaN], [KKS], [M] and other sources. Kapovich proved [Ka4] that for F there does not exist a natural symmetric analogue of Bonahon's intersection number between two geodesic currents.…”

Section: Introductionmentioning

confidence: 99%

Intersection Form, Laminations and Currents on Free Groups

Lustig

2009

Geom. Funct. Anal.

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Abstract. Let F be a free group of rank N ≥ 2, let µ be a geodesic current on F and let T be an R-tree with a very small isometric action of F . We prove that the geometric intersection number T, µ is equal to zero if and only if the support of µ is contained in the dual algebraic lamination L 2 (T ) of T . Applying this result, we obtain a generalization of a theorem of Francaviglia regarding length spectrum compactness for currents with full support. We use the main result to obtain "unique ergodicity" type properties for the attracting and repelling fixed points of atoroidal iwip elements of Out(F ) when acting both on the compactified outer Space and on the projectivized space of currents. We also show that the sum of the translation length functions of any two "sufficiently transverse" very small F -trees is bilipschitz equivalent to the translation length function of an interior point of the outer space. As another application, we define the notion of a filling element in F and prove that filling elements are "nearly generic" in F . We also apply our results to the notion of bounded translation equivalence in free groups.

Subset currents on free groups

Nagnibeda

2012

Geom Dedicata

We introduce and study the space of \emph{subset currents} on the free group $F_N$. A subset current on $F_N$ is a positive $F_N$-invariant locally finite Borel measure on the space $\mathfrak C_N$ of all closed subsets of $\partial F_N$ consisting of at least two points. While ordinary geodesic currents generalize conjugacy classes of nontrivial group elements, a subset current is a measure-theoretic generalization of the conjugacy class of a nontrivial finitely generated subgroup in $F_N$, and, more generally, in a word-hyperbolic group. The concept of a subset current is related to the notion of an "invariant random subgroup" with respect to some conjugacy-invariant probability measure on the space of closed subgroups of a topological group. If we fix a free basis $A$ of $F_N$, a subset current may also be viewed as an $F_N$-invariant measure on a "branching" analog of the geodesic flow space for $F_N$, whose elements are infinite subtrees (rather than just geodesic lines) of the Cayley graph of $F_N$ with respect to $A$.Comment: updated version; to appear in Geometriae Dedicat