Distance transforms for real-valued functions

Molchanov, Ilya; Terán, Pedro (2003). Distance transforms for real-valued functions. Journal of mathematical analysis and applications, 278(2), pp. 472-484. Elsevier 10.1016/S0022-247X(02)00719-9

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A set in a metric space gives rise to its distance function that associates with every point its distance to the nearest point in the set. This function is called the distance transform of the original set. In the same vein, given a real-valued function f we consider the expected distances from any point to
alevelset of f taken at a random height. This produces another function called a distance transform of f. Such transforms are called grey-scale distance transforms to signpost their differences from the binary case when sets (or their indicators) give rise to conventional distance functions. Basic
properties of the introduced grey-scale distance transform are discussed. The most important issue is the uniqueness problem whether two different functions may share the same distance transform. We answer this problem in a generality completely sufficient for all practical applications in imaging
sciences, the full-scale problem remains open.

Item Type:

Journal Article (Original Article)

Division/Institute:

08 Faculty of Science > Department of Mathematics and Statistics > Institute of Mathematical Statistics and Actuarial Science

UniBE Contributor:

Molchanov, Ilya

Subjects:

500 Science > 510 Mathematics

ISSN:

0022-247X

Publisher:

Elsevier

Language:

English

Submitter:

Ilya Molchanov

Date Deposited:

08 Aug 2016 15:56

Last Modified:

05 Dec 2022 14:57

Publisher DOI:

10.1016/S0022-247X(02)00719-9

BORIS DOI:

10.7892/boris.85365

URI:

https://boris.unibe.ch/id/eprint/85365

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