Title :
Finite random sets and morphology
Author :
Haralick, Robert M. ; Chen, Su ; Zhuang, Xinhua
Author_Institution :
Dept. of Electr. Eng., Washington Univ., Seattle, WA, USA
Abstract :
In order to be able to optimally design morphological shape extraction algorithms operating on binary digital images, a probability theory is needed for finite random sets and probability relations that show how the probability changes as a finite random set is propagated through a morphological operation. In this paper, we develop such a theory for finite random sets. We then demonstrate how to apply this theory for calculating the probability that a set S perturbed by min or max noise N and dilated or eroded by a structuring element K is a subset, superset, or hits a given set R. In some cases we obtain exact results and in some cases we obtain bounds for the desired probability
Keywords :
image processing; binary digital images; finite random set; finite random sets; image procesing; morphological shape extraction; morphology; pattern recognition; probability theory; subset; superset; Algorithm design and analysis; Design methodology; Image processing; Image representation; Image restoration; Morphological operations; Morphology; Pattern recognition; Probability; Shape;
Conference_Titel :
Pattern Recognition, 1994. Vol. 2 - Conference B: Computer Vision & Image Processing., Proceedings of the 12th IAPR International. Conference on
Conference_Location :
Jerusalem
Print_ISBN :
0-8186-6270-0
DOI :
10.1109/ICPR.1994.576876
