Conference proceeding
Image cellular complexes, morphological operators, and skeletonization
Proceedings of SPIE, v 2030(1), pp 266-275
23 Jun 1993
Abstract
The most common form for representing digital images is the rectangular matrix where each member of the matrix is a picture element. In a small neighborhood of the image plane, there is a finite number of elements and so a topology of finite sets is needed for digital images. The concepts of digital topology provide for finite sets, but they are not perfect solutions. Problems exist in the connectivity definitions for the object and the background and in the fact that boundaries can be represented by four different sets which are either inner or outer connected and either four or eight connected.
Metrics
8 Record Views
Details
- Title
- Image cellular complexes, morphological operators, and skeletonization
- Creators
- Michael Pyeron - Drexel UniversityOleh Tretiak - Drexel University
- Publication Details
- Proceedings of SPIE, v 2030(1), pp 266-275
- Conference
- Image Algebra and Morphological Image Processing IV, 4th
- Publisher
- Society of Photo-Optical Instrumentation Engineers (SPIE)
- Resource Type
- Conference proceeding
- Language
- English
- Academic Unit
- [Retired Faculty]
- Web of Science ID
- WOS:A1993BY45K00025
- Scopus ID
- 2-s2.0-85076175685
- Other Identifier
- 991019173650804721
InCites Highlights
Data related to this publication, from InCites Benchmarking & Analytics tool:
- Web of Science research areas
- Engineering, Electrical & Electronic
- Optics
- Statistics & Probability