Welcome!
To use the personalized features of this site, please log in or register.
If you have forgotten your username or password, we can help.
|
 |
Two Linear-Time Algorithms for Computing the Minimum Length Polygon of a Digital Contour
| |
|
Two Linear-Time Algorithms for Computing the Minimum Length Polygon of a Digital Contour
Xavier Provençal18, 19  and Jacques-Olivier Lachaud18
| (18) |
Laboratoire de Mathématiques, UMR 5127 CNRS, Université de Savoie, 73376 Le Bourget du Lac, France |
| (19) |
LIRMM, UMR 5506 CNRS, Université Montpellier II, 34392 Montpellier, France |
Abstract
The Minimum Length Polygon (MLP) is an interesting first order approximation of a digital contour. For instance, the convexity
of the MLP is characteristic of the digital convexity of the shape, its perimeter is a good estimate of the perimeter of the
digitized shape. We present here two novel equivalent definitions of MLP, one arithmetic, one combinatorial, and both definitions
lead to two different linear time algorithms to compute them.
Fulltext Preview (Small, Large)
 References secured to subscribers.
|
|
|
|
|
|