Detecting and visualizing 3-dimensional surgery
Abstract
Topological surgery in dimension is intrinsically connected with the classification of -manifolds and with patterns of natural phenomena. In this expository paper, we present two different approaches for understanding and visualizing the process of -dimensional surgery. In the first approach, we view the process in terms of its effect on the fundamental group. Namely, we present how -dimensional surgery alters the fundamental group of the initial manifold and present ways to calculate the fundamental group of the resulting manifold. We also point out how the fundamental group can detect the topological complexity of non-trivial embeddings that produce knotting. The second approach can only be applied for standard embeddings. For such cases, we give new visualizations for both types of -dimensional surgery as different rotations of the decompactified -sphere. Each rotation produces a different decomposition of the -sphere which corresponds to a different visualization of the -dimensional process of -dimensional surgery.
Keywords
Cite
@article{arxiv.1811.08384,
title = {Detecting and visualizing 3-dimensional surgery},
author = {Stathis Antoniou and Louis H. Kauffman and Sofa Lambropoulou},
journal= {arXiv preprint arXiv:1811.08384},
year = {2018}
}
Comments
22 pages, 13 figures