Publication detail

Structuring digital plane by the 8-adjacency graph with a set of walks

ŠLAPAL, J.

Original Title

Structuring digital plane by the 8-adjacency graph with a set of walks

Type

journal article - other

Language

English

Original Abstract

In the digital plane Z^2, we define connectedness induced by a set of walks of the same lengths in the 8-adjacency graph. The connectedness is shown to satisfy a digital analogue of the Jordan curve theorem. This proves that the 8-adjacency graph with a set of walks of the same lengths provides a convenient structure on the digital plane Z^2 for the study of digital images.

Keywords

Digital plane, 8-adjacency graph, walk, connectedness, Jordan curve theorem

Authors

ŠLAPAL, J.

Released

16. 11. 2017

Publisher

International Assocoation for Research and Science

Location

USA

ISBN

2367-895X

Periodical

International Journal of Mathematical and Computational Methods

Year of study

2017

Number

2

State

United States of America

Pages from

150

Pages to

154

Pages count

5

URL

https://www.iaras.org/iaras/home/caijmcm/structuring-digital-plane-by-the-8-adjacency-graph-with-a-set-of-walks

BibTex

@article{BUT155735,
  author="Josef {Šlapal}",
  title="Structuring digital plane by the 8-adjacency graph with a set of walks",
  journal="International Journal of Mathematical and Computational Methods",
  year="2017",
  volume="2017",
  number="2",
  pages="150--154",
  issn="2367-895X",
  url="https://www.iaras.org/iaras/home/caijmcm/structuring-digital-plane-by-the-8-adjacency-graph-with-a-set-of-walks"
}