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Related papers: Z-Structures on Product Groups

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Bestvina's notion of a Z-structure provides a general framework for group boundaries that includes Gromov boundaries of hyperbolic groups and visual boundaries of CAT(0) groups as special cases. A refinement, known as an EZ-structure has…

Geometric Topology · Mathematics 2022-07-19 Craig R. Guilbault , Brendan Burns Healy , Brian Pietsch

Motivated by the usefulness of boundaries in the study of hyperbolic and CAT(0) groups, Bestvina introduced a general approach to group boundaries via the notion of a Z-structure on a group G. Several variations on Z-structures have been…

Group Theory · Mathematics 2014-10-01 Craig R. Guilbault

We investigate the group $G \vee H$ obtained by gluing together two groups $G$ and $H$ at the neutral element. This construction curiously shares some properties with the free product but others with the direct product. Our results address…

Group Theory · Mathematics 2022-01-12 Maxime Gheysens , Nicolas Monod

Let $H$ be a group and $E$ a set such that $H \subseteq E$. We shall describe and classify up to an isomorphism of groups that stabilizes $H$ the set of all group structures that can be defined on $E$ such that $H$ is a subgroup of $E$. A…

Group Theory · Mathematics 2014-07-01 A. L. Agore , G. Militaru

Bestvina introduced a $\mathcal{Z}$-structure for a group $G$ to generalize the boundary of a CAT(0) or hyperbolic group. A refinement of this notion, introduced by Farrell and Lafont, includes a $G$-equivariance requirement, and is known…

Geometric Topology · Mathematics 2021-09-14 Craig Guilbault , Molly Moran , Kevin Schreve

We show that every rank two $p$-group acts freely and smoothly on a product of two spheres. This follows from a more general construction: given a smooth action of a finite group $G$ on a manifold $M$, we construct a smooth free action on…

Algebraic Topology · Mathematics 2010-07-01 Ozgun Unlu , Ergun Yalcin

In a previous paper [1] [MR4101040], we initiated a systematic study of semihypergroups and had a thorough discussion about some important analytic and algebraic objects associated to this class of objects. In this paper, we investigate…

Functional Analysis · Mathematics 2022-09-30 Choiti Bandyopadhyay

The holomorph of a discrete group $G$ is the universal semi-direct product of $G$. In chapter 1 we describe why it is an interesting object and state main results. In chapter 2 we recall the classical definition of the holomorph as well as…

Group Theory · Mathematics 2007-05-23 Maria S. Voloshina

Let $G$ be a group and $X$ be a product system over a semigroup $P$. Suppose $G$ has a left action on $P$ and $P$ has a right action on $G$, so that one can form a Zappa-Sz\'ep product $P\bowtie G$. We define a Zappa-Sz\'ep action of $G$ on…

Operator Algebras · Mathematics 2020-12-02 Boyu Li , Dilian Yang

We classify the finite groups $G$ such that the group of units of the integral group ring ${\mathbb Z} G$ has a subgroup of finite index which is a direct product of free-by-free groups.

Group Theory · Mathematics 2007-05-23 Eric Jespers , Antonio Pita , Angel del Rio , Manuel Ruiz , Pavel Zalesski

Motivated by the notion of boundary for hyperbolic and $CAT(0)$ groups, M. Bestvina in "Local Homology Properties of Boundaries of Groups" introduced the notion of a (weak) $\mathcal Z$-structure and (weak) $\mathcal Z$-boundary for a group…

Geometric Topology · Mathematics 2022-07-20 M. Cárdenas , F. F. LasHeras , A. Quintero

A subset of a group is said to be product-free if it does not contain three elements satisfying the equation $xy=z$. We give a negative answer to a question of Babai and S\'os on the existence of large product-free sets by model theoretic…

Group Theory · Mathematics 2019-07-31 Daniel Palacín

Let K be a compact Lie group and G its complexification. For a not necessarily reduced Stein K-space X we show that there is a complex space Z endowed with a holomorphic action of the universal complexification G of K that contains X as an…

Complex Variables · Mathematics 2007-05-23 J. Hausen , P. Heinzner

Let $K$ be a field, let $X$ be a connected smooth $K$-scheme and let $G,H$ be two smooth connected $K$-group schemes. Given $Y \to X$ a $G$-torsor and $Z \to Y$ an $H$-torsor, we study whether one can find an extension $E$ of $G$ by $H$ so…

Algebraic Geometry · Mathematics 2023-06-02 Mathieu Florence , Diego Izquierdo , Giancarlo Lucchini Arteche

We introduce the notion of an EZ-structure on a group. Delta-hyperbolic groups and CAT(0)-groups have EZ-structures. We show torsion-free groups having an EZ-structure automatically have an action by homeomorphisms on a closed…

Geometric Topology · Mathematics 2007-05-23 F. T. Farrell , J. -F. Lafont

A classification of the ways in which an element of a free group can be expressed as a product of commutators or as a product of squares is given. This is then applied to some particular classes of elements. Finally, a question about…

Group Theory · Mathematics 2008-02-03 Leo P. Comerford , Charles C. Edmunds

An LR-structure on a Lie algebra is a bilinear product, satisfying certain commutativity relations, and which is compatible with the Lie product. LR-structures arise in the study of simply transitive affine actions on Lie groups. In…

Rings and Algebras · Mathematics 2009-06-08 Dietrich Burde , Karel Dekimpe , Kim Vercammen

We initiate systematic study of EZ-structures (and associated boundaries) of groups acting on spaces that admit consistent and conical (equivalently, consistent and convex) geodesic bicombings. Such spaces recently drew a lot of attention…

Group Theory · Mathematics 2025-05-13 Daniel Danielski

Product systems are the classifying structures for semigroups of endomorphisms of B(H), in that two $E_0$-semigroups are cocycle conjugate iff their product systems are isomorphic. Thus it is important to know that every abstract product…

Operator Algebras · Mathematics 2007-05-23 William Arveson

This survey article explores the notion of z-classes in groups. The concept introduced here is related to the notion of orbit types in transformation groups, and types or genus in the representation theory of finite groups of Lie type. Two…

Group Theory · Mathematics 2024-04-04 Sushil Bhunia , Anupam Singh
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