Leon A. Luxemburg, Steven B. Damelin
Published 2023-05-22Version 1
In this paper we study the scale-space classification of signals via the maximal set of kernels. We use a geometric approach which arises naturally when we consider parameter variations in scale-space. We derive the Fourier transform formulas for quick and efficient computation of zero-crossings and the corresponding classifying trees. General theory of convergence for convolutions is developed, and practically useful properties of scale-space classification are derived as a consequence also give a complete topological description of level curves for convolutions of signals with the maximal set of kernels. We use these results to develop a bifurcation theory for the curves under the parameter changes. This approach leads to a novel set of integer invariants for arbitrary signals.
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