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Proceedings Paper

Anamorphoses and function lattices
Author(s): Jean C. Serra
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Paper Abstract

The classical notion of a stack, or flat, operator on numerical functions is extended to functions on a complete lattice T. This implies to introduce cross sections of such functions, and also anamorphoses. The two theorems which characterize function operators from flat primitives, and their commutability under anamorphosis are then proved. An application to color images is presented.

Paper Details

Date Published: 23 June 1993
PDF: 10 pages
Proc. SPIE 2030, Image Algebra and Morphological Image Processing IV, (23 June 1993); doi: 10.1117/12.146650
Show Author Affiliations
Jean C. Serra, Ecole des Mines de Paris (France)

Published in SPIE Proceedings Vol. 2030:
Image Algebra and Morphological Image Processing IV
Edward R. Dougherty; Paul D. Gader; Jean C. Serra, Editor(s)

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