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How to find a Khalimsky-continuous approximation of a real-valued function. In Combinatorial Image Analysis
Uppsala University, Teknisk-naturvetenskapliga vetenskapsområdet, Mathematics and Computer Science, Department of Mathematics.
2004 (English)Conference paper (Refereed)
Abstract [en]

Given a real-valued continuous function defined on n-dimensional Euclidean space, we construct a Khalimsky-continuous integer-valued approximation. From a geometrical point of view, this digitization takes a hypersurface that is the graph of a function and produces a digital hypersurface—the graph of the digitized function.

Place, publisher, year, edition, pages
URN: urn:nbn:se:uu:diva-70899OAI: oai:DiVA.org:uu-70899DiVA: diva2:98810
Available from: 2007-01-17 Created: 2007-01-17

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Melin, Erik
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