A simple expression for the map of Asplund's distances with the multiplicative Logarithmic Image Processing (LIP) law

· 2017 · cs.CV · arXiv 1708.08992

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abstract

We introduce a simple expression for the map of Asplund's distances with the multiplicative Logarithmic Image Processing (LIP) law. It is a difference between a morphological dilation and a morphological erosion with an additive structuring function which corresponds to a morphological gradient.

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A Link Between the Multiplicative and Additive Functional Asplund's Metrics

cs.CV · 2019-07-17 · unverdicted · novelty 5.0

The LIP-additive Asplund distance map of an image equals the LIP-multiplicative Asplund distance map of a transformed image, related by the LIP isomorphism.

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A Link Between the Multiplicative and Additive Functional Asplund's Metrics cs.CV · 2019-07-17 · unverdicted · none · ref 24 · internal anchor
The LIP-additive Asplund distance map of an image equals the LIP-multiplicative Asplund distance map of a transformed image, related by the LIP isomorphism.

A simple expression for the map of Asplund's distances with the multiplicative Logarithmic Image Processing (LIP) law

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