Your search keyword '"Conner, Gregory R."' showing total 3 results

1. Some anomalous examples of lifting spaces

Author

Conner, Gregory R., Herfort, Wolfgang, and Pavešić, Petar

Subjects

Mathematics - General Topology, Mathematics - Geometric Topology, 54B25 (Primary), 54B35, 54H20, 54C (Secondary}

Abstract

An inverse limit of a sequence of covering spaces over a given space $X$ is not, in general, a covering space over $X$ but is still a lifting space, i.e. a Hurewicz fibration with unique path lifting property. Of particular interest are inverse limits of finite coverings (resp. finite regular coverings), which yield fibrations whose fiber is homeomorphic to the Cantor set (resp. profinite topological group). To illustrate the breadth of the theory, we present in this note some curious examples of lifting spaces that cannot be obtained as inverse limits of covering spaces., Comment: To the Memory of Professor Sibe Marde\v{s}i\'{c}

Published

2017

2. Self-affine Manifolds

Author

Conner, Gregory R. and Thuswaldner, Jörg M.

Subjects

Mathematics - Geometric Topology, 28A80, 57M50, 57N45, 55U10, 57Q25

Abstract

This paper studies closed 3-manifolds which are the attractors of a system of finitely many affine contractions that tile $\mathbb{R}^3$. Such attractors are called self-affine tiles. Effective characterization and recognition theorems for these 3-manifolds as well as theoretical generalizations of these results to higher dimensions are established. The methods developed build a bridge linking geometric topology with iterated function systems and their attractors. A method to model self-affine tiles by simple iterative systems is developed in order to study their topology. The model is functorial in the sense that there is an easily computable map that induces isomorphisms between the natural subdivisions of the attractor of the model and the self-affine tile. It has many beneficial qualities including ease of computation allowing one to determine topological properties of the attractor of the model such as connectedness and whether it is a manifold. The induced map between the attractor of the model and the self-affine tile is a quotient map and can be checked in certain cases to be monotone or cell-like. Deep theorems from geometric topology are applied to characterize and develop algorithms to recognize when a self-affine tile is a topological or generalized manifold in all dimensions. These new tools are used to check that several self-affine tiles in the literature are 3-balls. An example of a wild 3-dimensional self-affine tile is given whose boundary is a topological 2-sphere but which is not itself a 3-ball. The paper describes how any 3-dimensional handlebody can be given the structure of a self-affine 3-manifold. It is conjectured that every self-affine tile which is a manifold is a handlebody., Comment: 40 pages, 13 figures, 2 tables

Published

2014

3. Commensurators and Quasi-Normal Subgroups

Author

Conner, Gregory R. and Mihalik, Michael L.

Subjects

Mathematics - Group Theory, Mathematics - Geometric Topology, 20F65, 20F69,57M07

Abstract

We say A is a quasi-normal subgroup of the group G if the commensurator of A in G is all of G. We develop geometric versions of commensurators in finitely generated groups. In particular, g is an element of the commensurator of A in G iff the Hausdorff distance between A and gA is finite. We show that a quasi-normal subgroup of a group is the kernel of a certain map, and a subgroup of a finitely generated group is quasi-normal iff the natural coset graph is locally finite. This last equivalence is particularly useful for deriving asymptotic results for finitely generated groups. Our primary goal in this paper is to develop the basic theory of quasi-normal subgroups, comparing analogous results for normal subgroups and isolating differences between quasi-normal and normal subgroups., Comment: 23 pages, 0 figures

Published

2009