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Proceedings Paper

Computational representation of lattice operators
Author(s): Divyendu Sinha; Edward R. Dougherty
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Paper Abstract

Computational mathematical morphology is extended to provide computational representations of increasing and nonincreasing windowed translation-invariant operators of the form (psi) : LN yields M, where L and M are complete lattices. Representations are grounded on the Riemann zeta function and provide lattice-valued extensions of the classical disjunctive- normal-form, reduced, and positive logical representations. Both direct and dual representations are given. Representations are morphological because they involve elemental forms of erosion, dilation, or the hit-or-miss transform.

Paper Details

Date Published: 28 March 1995
PDF: 8 pages
Proc. SPIE 2424, Nonlinear Image Processing VI, (28 March 1995); doi: 10.1117/12.205217
Show Author Affiliations
Divyendu Sinha, CUNY/College of Staten Island (United States)
Edward R. Dougherty, Rochester Institute of Technology (United States)

Published in SPIE Proceedings Vol. 2424:
Nonlinear Image Processing VI
Edward R. Dougherty; Jaakko T. Astola; Harold G. Longbotham; Nasser M. Nasrabadi; Aggelos K. Katsaggelos, Editor(s)

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