Quasi-isometries of graph manifolds do not preserve non-positive curvature

Nicol, Andrew

15 October 2014

No description available.

Mathematics

graph manifolds

geometric group theory

quasi-isometries

non-positive curvature

bounded cohomology

relative hyperbolicity

isolated flats

[en] MULTIPLICATIVE ERGODIC THEOREM IN NONPOSITIVELY CURVED SPACES / [pt] TEOREMA ERGÓDICO MULTIPLICATIVO EM ESPAÇOS MÉTRICOS DE CURVATURA NÃO-POSITIVA

09 November 2021

[pt] Apresentaremos uma versão de Teorema Ergódico Multiplicativo para cociclos subaditivos devido a Karlsson e Margulis. Como aplicação, analisaremos três exemplos de cociclos nos seguintes espaços: Grafo gerado por grupo livre em dois geradores, disco hiperbólico, espaco das matrizes positivas simétricas definidas. Também usaremos o Teorema de Karlsson e Margulis para mostrar o Teorema de Oseledets. / [en] We will show a version of Multiplicative Ergodic Theorem for subbaditive cocycles due to Karlsson and Margulis. As an application, we will analyze three examples of cocycles in following spaces: graph generated by free group of two generators, hyperbolic disc, space of positive definite symetric matrices. Also, we will use the Theorem of Karlsson and Margulis to prove Theorem of Oseledets.

[pt] TEORIA ERGODICA

[pt] TEOREMA ERGODICO MULTIPLICATIVO

[pt] CURVATURA NAO-POSITIVA

[pt] ISOMETRIAS

[en] ERGODIC THEORY

[en] MULTIPLICATIVE ERGODIC THEOREM

[en] NON-POSITIVE CURVATURE

[en] ISOMETRIES

Encoding and detecting properties in finitely presented groups

Gardam, Giles

January 2017

In this thesis we study several properties of finitely presented groups, through the unifying paradigm of encoding sought-after group properties into presentations and detecting group properties from presentations, in the context of Geometric Group Theory. A group law is said to be detectable in power subgroups if, for all coprime m and n, a group G satisfies the law if and only if the power subgroups G(^m) and G(ⁿ) both satisfy the law. We prove that for all positive integers c, nilpotency of class at most c is detectable in power subgroups, as is the k-Engel law for k at most 4. In contrast, detectability in power subgroups fails for solvability of given derived length: we construct a finite group W such that W(²) and W(³) are metabelian but W has derived length 3. We analyse the complexity of the detectability of commutativity in power subgroups, in terms of finite presentations that encode a proof of the result. We construct a census of two-generator one-relator groups of relator length at most 9, with complete determination of isomorphism type, and verify a conjecture regarding conditions under which such groups are automatic. Furthermore, we introduce a family of one-relator groups and classify which of them act properly cocompactly on complete CAT(0) spaces; the non-CAT(0) examples are counterexamples to a variation on the aforementioned conjecture. For a subclass, we establish automaticity, which is needed for the census. The deficiency of a group is the maximum over all presentations for that group of the number of generators minus the number of relators. Every finite group has non-positive deficiency. For every prime p we construct finite p-groups of arbitrary negative deficiency, and thereby complete Kotschick's proposed classification of the integers which are deficiencies of Kähler groups. We explore variations and embellishments of our basic construction, which require subtle Schur multiplier computations, and we investigate the conditions on inputs to the construction that are necessary for success. A well-known question asks whether any two non-isometric finite volume hyperbolic 3-manifolds are distinguished from each other by the finite quotients of their fundamental groups. At present, this has been proved only when one of the manifolds is a once-punctured torus bundle over the circle. We give substantial computational evidence in support of a positive answer, by showing that no two manifolds in the SnapPea census of 72 942 finite volume hyperbolic 3-manifolds have the same finite quotients. We determine examples of sizeable graphs, as required to construct finitely presented non-hyperbolic subgroups of hyperbolic groups, which have the fewest vertices possible modulo mild topological assumptions.

Twisted K-theory with coefficients in a C*-algebra and obstructions against positive scalar curvature metrics / Getwistete K-Theorie mit Koeffizienten in einer C*-Algebra und Obstruktionen gegen positive skalare Krümmung

Pennig, Ulrich

31 August 2009

No description available.

510 Mathematik

Mathematics and Computer Science

getwistete K-Theorie

Indextheorie

positive Skalarkrümmung

C*-Algebra

Hilbert C*-Moduln

twisted K-theory

index theory

positive scalar curvature

C* algebra

Hilbert C* modules

31.61

EDCQ 100: Positive curvature manifolds