Search results for " 43A07"

showing 2 items of 2 documents

Hyperbolicity as an obstruction to smoothability for one-dimensional actions

2017

Ghys and Sergiescu proved in the $80$s that Thompson's group $T$, and hence $F$, admits actions by $C^{\infty}$ diffeomorphisms of the circle . They proved that the standard actions of these groups are topologically conjugate to a group of $C^\infty$ diffeomorphisms. Monod defined a family of groups of piecewise projective homeomorphisms, and Lodha-Moore defined finitely presentable groups of piecewise projective homeomorphisms. These groups are of particular interest because they are nonamenable and contain no free subgroup. In contrast to the result of Ghys-Sergiescu, we prove that the groups of Monod and Lodha-Moore are not topologically conjugate to a group of $C^1$ diffeomorphisms. Fur…

Pure mathematicsMathematics::Dynamical Systems[ MATH.MATH-GR ] Mathematics [math]/Group Theory [math.GR][ MATH.MATH-DS ] Mathematics [math]/Dynamical Systems [math.DS][MATH.MATH-DS]Mathematics [math]/Dynamical Systems [math.DS]Group Theory (math.GR)Dynamical Systems (math.DS)Fixed pointPSL01 natural sciences[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]57M60Homothetic transformationMathematics::Group Theorypiecewise-projective homeomorphisms0103 physical sciencesFOS: Mathematics0101 mathematicsMathematics - Dynamical SystemsMathematics::Symplectic GeometryMathematicsreal37C85 57M60 (Primary) 43A07 37D40 37E05 (Secondary)diffeomorphismsPrimary 37C85 57M60. Secondary 43A07 37D40 37E0543A07Group (mathematics)37C8537D40010102 general mathematicsMSC (2010) : Primary: 37C85 57M60Secondary: 37D40 37E05 43A0737E0516. Peace & justiceAction (physics)hyperbolic dynamicsrigidityc-1 actionsbaumslag-solitar groupshomeomorphismslocally indicable groupPiecewiseInterval (graph theory)010307 mathematical physicsGeometry and TopologyTopological conjugacyMathematics - Group Theoryintervalgroup actions on the interval
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Highly transitive actions of groups acting on trees

2015

We show that a group acting on a non-trivial tree with finite edge stabilizers and icc vertex stabilizers admits a faithful and highly transitive action on an infinite countable set. This result is actually true for infinite vertex stabilizers and some more general, finite of infinite, edge stabilizers that we call highly core-free. We study the notion of highly core-free subgroups and give some examples. In the case of amalgamated free products over highly core-free subgroups and HNN extensions with highly core-free base groups we obtain a genericity result for faithful and highly transitive actions. In particular, we recover the result of D. Kitroser stating that the fundamental group of …

Vertex (graph theory)20B22 20E06 20E08Transitive relationApplied MathematicsGeneral Mathematics010102 general mathematicsamenable actionsHighly transitive actionsTransitive actionGroup Theory (math.GR)0102 computer and information sciences01 natural sciencesgroups acting on trees[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]CombinatoricsMathematics::Group TheoryFree product010201 computation theory & mathematicsFOS: MathematicsMSC: Primary 20B22; Secondary 20E06 20E08 43A07Countable setHNN extension0101 mathematicsMathematics - Group TheoryMathematicsProceedings of the American Mathematical Society
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