Titlebook: Geometric Group Theory; An Introduction Clara L?h Textbook 2017 Springer International Publishing AG 2017 MSC 2010 20F65 20F67 20F69 20F05

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Cayley graphsA fundamental question of geometric group theory is how groups can be viewed as geometric objects; one way to view a (finitely generated) group as a geometric object is via Cayley graphs:

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Growth types of groupsThe first quasi-isometry invariant we discuss in detail is the growth type. We essentially measure the “volume” of balls in a given finitely generated group and study the asymptotic behaviour when the radius tends to infinity.

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Amenable groupsThe notion of amenability revolves around the leitmotiv of (almost) invariance. Different interpretations of this leitmotiv lead to different characterisations of amenable groups, e.g., via invariant means, F?lner sets (i.e., almost invariant finite subsets), decomposition properties, or fixed point properties.

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Geometric Group Theory978-3-319-72254-2Series ISSN 0172-5939 Series E-ISSN 2191-6675

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Definition of Drowning: A Progress Reportetric aspect of groups by looking at group actions, which can be viewed as a generalisation of seeing groups as symmetry groups.We start by recalling some basic concepts about group actions (Chapter 4.1).

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