Abstract
We investigate the inverse scale space flow as a decomposition method for decomposing data into generalised singular vectors. We show that the inverse scale space flow, based on convex and even and positively one-homogeneous regularisation functionals, can decompose data represented by the application of a forward operator to a linear combination of generalised singular vectors into its individual singular vectors. We verify that for this decomposition to hold true, two additional conditions on the singular vectors are sufficient: orthogonality in the data space and inclusion of partial sums of the subgradients of the singular vectors in the subdifferential of the regularisation functional at zero.We also address the converse question of when the inverse scale space flow returns a generalised singular vector given that the initial data is arbitrary (and therefore not necessarily in the range of the forward operator). We prove that the inverse scale space flow is guaranteed to return a singular vector if the data satisfies a novel dual singular vector condition.We conclude the paper with numerical results that validate the theoretical results and that demonstrate the importance of the additional conditions required to guarantee the decomposition result.
Highlights
Regularisation methods are essential tools for the stable approximation of solutions of illposed inverse problems
In this paper we have investigated the possibility of using the inverse scale space flow as a decomposition method for even and positively one-homogeneous regularisation functionals
We have formulated conditions under which the inverse scale space flow will give a decomposition of a linear combination of generalised singular vectors
Summary
Regularisation methods are essential tools for the stable approximation of solutions of illposed inverse problems. In [70] Gilboa initiated the idea of a non-linear spectral decomposition of singular vectors by defining a spectrum based on the forward-scale space formulation of the TV model. In [75] it has further been shown that the non-linear spectral transform can decompose data into a finite set of singular vectors, given that the corresponding regularisation functional is a one-norm concatenated with a linear matrix such that the matrix applied to its transpose is diagonally dominant (see [75, theorem 9]). We address the question of how to characterise the first inverse scale space step in case the given data is arbitrary In this case we investigate under which conditions the first step is a generalised singular vector. We will present numerical results to support the theoretical results and conclude with an outlook of open questions and problems
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