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Geometry of actions, expanders and warped conesVigolo, Federico January 2018 (has links)
In this thesis we introduce a notion of graphs approximating actions of finitely generated groups on metric and measure spaces. We systematically investigate expansion properties of said graphs and we prove that a sequence of graphs approximating a fixed action ρ forms a family of expanders if and only if ρ is expanding in measure. This enables us to rely on a number of known results to construct numerous new families of expander (and superexpander) graphs. Proceeding in our investigation, we show that the graphs approximating an action are uniformly quasi-isometric to the level sets of the associated warped cone. The existence of such a relation between approximating graphs and warped cones has twofold advantages: on the one hand it implies that warped cones arising from actions that are expanding in measure coarsely contain families of expanders, on the other hand it provides a geometric model for the approximating graphs allowing us to study the geometry of the expander thus obtained. The rest of the work is devoted to the study of the coarse geometry of warped cones (and approximating graphs). We do so in order to prove rigidity results which allow us to prove that our construction is flexible enough to produce a number of non coarsely equivalent new families of expanders. As a by-product, we also show that some of these expanders enjoy some rather peculiar geometric properties, e.g. we can construct expanders that are coarsely simply connected.
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A Mayer-Vietoris Spectral Sequence for C*-Algebras and Coarse GeometryNaarmann, Simon 10 September 2018 (has links)
No description available.
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Coarse Cohomology with twisted CoefficientsHartmann, Elisa 25 February 2019 (has links)
No description available.
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Large scale dimension theory of metric spacesCappadocia, Christopher 11 1900 (has links)
This thesis studies the large scale dimension theory of metric spaces. Background on dimension theory is provided, including topological and asymptotic dimension, and notions of nonpositive curvature in metric spaces are reviewed. The hyperbolic dimension of Buyalo and Schroeder is surveyed. Miscellaneous new results on hyperbolic dimension are proved, including a union theorem, an estimate for central group extensions, and the vanishing of hyperbolic dimension for countable abelian groups. A new quasi-isometry invariant called weak hyperbolic dimension (abbreviated $\wdim$) is introduced and developed. Weak hyperbolic dimension is computed for a variety of metric spaces,
including the fundamental computation $\wdim \Hyp^n = n-1$. An estimate is proved for (not necessarily central) group extensions. Weak dimension is used to obtain the quasi-isometric nonembedding result $\Hyp^4 \not \rightarrow \Sol \times \Sol$ and possible directions for further nonembedding applications are explored. / Thesis / Doctor of Philosophy (PhD) / Shapes and spaces are studied from the "large scale" or "far away" point of view. Various notions of dimension for such spaces are studied.
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Secondary large-scale index theory and positive scalar curvatureZeidler, Rudolf 24 August 2016 (has links)
No description available.
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Some Aspects on Coarse Homotopy Theory / Einige Aspekte der groben HomotopietheorieNorouzizadeh, Behnam 28 August 2009 (has links)
No description available.
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On Følner sets in topological groupsSchneider, Friedrich Martin, Thom, Andreas 04 June 2020 (has links)
We extend Følner’s amenability criterion to the realm of general topological groups. Building on this, we show that a topological group G is amenable if and only if its left-translation action can be approximated in a uniform manner by amenable actions on the set G. As applications we obtain a topological version of Whyte’s geometric solution to the von Neumann problem and give an affirmative answer to a question posed by Rosendal.
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Index Theory and Positive Scalar Curvature / Index-Theorie und positive SkalarkrümmungPape, Daniel 23 September 2011 (has links)
No description available.
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