Dynamic scale-space paradigms versus mathematical morphology?

Dynamic Scale - Space Paradigmversusmathematical Morphology ?

Image formation is described by means of modern geometry in terms of topological and geometric curvatures. These curvatures and derived equivalences are a quantisation of the set of rules for constructing the image in particular along discontinuity, singularity and bifurcation sets. A simpliication of the set of construction rules is proposed by applying a dynamic scale-space theory. Dynamic he...

Dynamic Scale-Space Paradigm

Image formation is described by means of modern geometry in terms of topological and geometric curvatures. These curvatures and derived equivalences are a quantisation of the set of rules for constructing the image in particular along discontinuity, singularity and bifurcation sets. A simpliication of the set of construction rules is proposed by applying a dynamic scale-space paradigm. Dynamic ...

Morphological Scale Space and Mathematical Morphology

Morphological Scale - spacePaul

Scale-space is an important recent concept used in image processing and pattern recognition. Traditional scale-space is generated by a linear smoothing operation. We present here a nonlinear type of smoother related to mathematical morphology which meets (modiied) \scale-space ax-ioms" and also generates a \scale-space." This scale-space is full-plane and preserves the positions of features.

Scale Space Properties of the Multiscale Morphological Closing-opening Filter

\Scale-space" is an important recent concept used in image and signal processing and pattern recognition. Traditional scale-space is generated by a linear Gaus-sian smoothing operation. We present here a nonlinear type of smoother corresponding to the multiscale opening and closing operations of mathematical morphology which also generates a \scale-space." We show that a parabolic structuring e...