The spirals of the Slope Chain Code. (November 2019)
- Record Type:
- Journal Article
- Title:
- The spirals of the Slope Chain Code. (November 2019)
- Main Title:
- The spirals of the Slope Chain Code
- Authors:
- Bribiesca, Ernesto
- Abstract:
- Highlights: A new and easy method for representing spirals via the Slope Chain Code is introduced. A new spiral called the Slope Chain Code (SCC) polygonal spiral is presented. The chain of the spiral of Archimedes is described via the SCC. Abstract: Generally speaking, a spiral is a 2D curve which winds about a fixed point. Now, we present a new, alternative, and easy way to describe and generate spirals by means of the use of the Slope Chain Code (SCC) [E. Bribiesca, A measure of tortuosity based on chain coding, Pattern Recognition 46 (2013) 716–724]. Thus, each spiral is represented by only one chain. The chain elements produce a finite alphabet which allows us to use grammatical techniques for spiral classification. Spirals are composed of constant straight-line segments and their chain elements are obtained by calculating the slope changes between contiguous straight-line segments (angle of contingence) scaled to a continuous range from − 1 ( − 180 ∘ ) to 1 (180 ∘ ). The SCC notation is invariant under translation, rotation, optionally under scaling, and it does not use a grid. Other interesting properties can be derived from this notation, such as: the mirror symmetry and inverse spirals, the accumulated slope, the slope change mean, and tortuosity for spirals. We introduce new concepts of projective polygonal paths and osculating polygons. We present a new spiral called the SCC polygonal spiral and its chain which is described by the numerical sequence 2 n for nHighlights: A new and easy method for representing spirals via the Slope Chain Code is introduced. A new spiral called the Slope Chain Code (SCC) polygonal spiral is presented. The chain of the spiral of Archimedes is described via the SCC. Abstract: Generally speaking, a spiral is a 2D curve which winds about a fixed point. Now, we present a new, alternative, and easy way to describe and generate spirals by means of the use of the Slope Chain Code (SCC) [E. Bribiesca, A measure of tortuosity based on chain coding, Pattern Recognition 46 (2013) 716–724]. Thus, each spiral is represented by only one chain. The chain elements produce a finite alphabet which allows us to use grammatical techniques for spiral classification. Spirals are composed of constant straight-line segments and their chain elements are obtained by calculating the slope changes between contiguous straight-line segments (angle of contingence) scaled to a continuous range from − 1 ( − 180 ∘ ) to 1 (180 ∘ ). The SCC notation is invariant under translation, rotation, optionally under scaling, and it does not use a grid. Other interesting properties can be derived from this notation, such as: the mirror symmetry and inverse spirals, the accumulated slope, the slope change mean, and tortuosity for spirals. We introduce new concepts of projective polygonal paths and osculating polygons. We present a new spiral called the SCC polygonal spiral and its chain which is described by the numerical sequence 2 n for n ≥ 3, to the best of our knowledge this is the first time that this spiral and its chain are presented. The importance of this spiral and its chain is that this chain is covering all the slope changes of all the regular polygons composed of n edges (n-gons). Also, we describe the chain which generates the spiral of Archimedes. Finally, we present some results of different kind of spirals from the real world, including spiral patterns in shells. … (more)
- Is Part Of:
- Pattern recognition. Volume 95(2019:Nov.)
- Journal:
- Pattern recognition
- Issue:
- Volume 95(2019:Nov.)
- Issue Display:
- Volume 95 (2019)
- Year:
- 2019
- Volume:
- 95
- Issue Sort Value:
- 2019-0095-0000-0000
- Page Start:
- 247
- Page End:
- 260
- Publication Date:
- 2019-11
- Subjects:
- Slope chain code -- Polygonal curves -- Polygonal paths -- Osculating polygons -- Broken lines -- Chain coding -- The SCC polygonal spiral
Pattern perception -- Periodicals
Perception des structures -- Périodiques
Patroonherkenning
006.4 - Journal URLs:
- http://www.sciencedirect.com/science/journal/00313203 ↗
http://www.sciencedirect.com/ ↗ - DOI:
- 10.1016/j.patcog.2019.06.016 ↗
- Languages:
- English
- ISSNs:
- 0031-3203
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store - Ingest File:
- 11157.xml