Closing (morphology)

In mathematical morphology, the closing of a set (binary image) A by a structuring element B is the erosion of the dilation of that set,

A\bullet B=(A\oplus B)\ominus B,\,

The closing of the dark-blue shape (union of two squares) by a disk, resulting in the union of the dark-blue shape and the light-blue areas.

where $\oplus$ and $\ominus$ denote the dilation and erosion, respectively.

In image processing, closing is, together with opening, the basic workhorse of morphological noise removal. Opening removes small objects, while closing removes small holes.

Properties

It is idempotent, that is, $(A\bullet B)\bullet B=A\bullet B$ .
It is increasing, that is, if $A\subseteq C$ , then $A\bullet B\subseteq C\bullet B$ .
It is extensive, i.e., $A\subseteq A\bullet B$ .
It is translation invariant.

gollark: Oh, one of the weird Intel cards with a few mobile CPUs on them?

gollark: <@425427655421329448> https://phoronix.com/scan.php?page=news_item&px=Intel-Xeon-Phi-Gentoo

gollark: You probably need to write a kernel driver of some sort.

gollark: I don't think they have filesystems?

gollark: All OSes are merely bootloaders for browsers.

Bibliography

Image Analysis and Mathematical Morphology by Jean Serra, ISBN 0-12-637240-3 (1982)
Image Analysis and Mathematical Morphology, Volume 2: Theoretical Advances by Jean Serra, ISBN 0-12-637241-1 (1988)
An Introduction to Morphological Image Processing by Edward R. Dougherty, ISBN 0-8194-0845-X (1992)

External links

Introduction to mathematical morphology

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Closing (morphology)

Properties

See also

Bibliography

External links