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Dilation is one of the basic operations in mathematical morphology. Originally developed for binary images, it has been expanded first to grayscale images, and then to complete lattices. The dilation operation usually uses a structuring element for probing and expanding the shapes contained in the input image. ==Binary operator== In binary morphology, dilation is a shift-invariant (translation invariant) operator, strongly related to the Minkowski addition. A binary image is viewed in mathematical morphology as a subset of a Euclidean space R''d'' or the integer grid Z''d'', for some dimension ''d''. Let ''E'' be a Euclidean space or an integer grid, ''A'' a binary image in ''E'', and ''B'' a structuring element regarded as a subset of R''d''. The dilation of ''A'' by ''B'' is defined by: :: where ''A''''b'' is the translation of ''A'' by ''b''. Dilation is commutative, also given by: . If ''B'' has a center on the origin, then the dilation of ''A'' by ''B'' can be understood as the locus of the points covered by ''B'' when the center of ''B'' moves inside ''A''. The dilation of a square of side 10, centered at the origin, by a disk of radius 2, also centered at the origin, is a square of side 14, with rounded corners, centered at the origin. The radius of the rounded corners is 2. The dilation can also be obtained by: , where ''B''''s'' denotes the symmetric of ''B'', that is, . 抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)』 ■ウィキペディアで「Dilation (morphology)」の詳細全文を読む スポンサード リンク
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