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,

${\displaystyle A\bullet B=(A\oplus B)\ominus B,\,}$

where ${\displaystyle \oplus }$ and ${\displaystyle \ominus }$ 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, ${\displaystyle (A\bullet B)\bullet B=A\bullet B}$.
• It is increasing, that is, if ${\displaystyle A\subseteq C}$, then ${\displaystyle A\bullet B\subseteq C\bullet B}$.
• It is extensive, i.e., ${\displaystyle A\subseteq A\bullet B}$.
• It is translation invariant.

See also

• Mathematical morphology
• Dilation
• Erosion
• Opening
• Top-hat transformation

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