Proximal Nerve Complexes. A Computational Topology Approach
Computational Geometry
2017-04-21 v1
Abstract
This article introduces a theory of proximal nerve complexes and nerve spokes, restricted to the triangulation of finite regions in the Euclidean plane. A nerve complex is a collection of filled triangles with a common vertex, covering a finite region of the plane. Structures called -spokes, , are a natural extension of nerve complexes. A -spoke is the union of a collection of filled triangles that pairwise either have a common edge or a common vertex. A consideration of the closeness of nerve complexes leads to a proximal view of simplicial complexes. A practical application of proximal nerve complexes is given, briefly, in terms of object shape geometry in digital images.
Keywords
Cite
@article{arxiv.1704.05909,
title = {Proximal Nerve Complexes. A Computational Topology Approach},
author = {J. F. Peters},
journal= {arXiv preprint arXiv:1704.05909},
year = {2017}
}
Comments
16 pages, 9 figures