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Total Variation and Related Methods II

Total Variation and Related Methods II. Variational Methods and their Analysis. We investigate the analysis of variational methods in imaging Most general form:. Variational Methods and their Analysis. Questions: Existence Uniqueness

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Total Variation and Related Methods II

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  1. Total Variation and Related Methods II

  2. Total Variation Variational Methods and their Analysis • We investigate the analysis of variational methods in imaging • Most general form:

  3. Total Variation Variational Methods and their Analysis • Questions: • Existence • Uniqueness • Optimality conditions for solutions (-> numerical methods) • Structural properties of solutions • Asymptotic behaviour with respect to l

  4. Total Variation Variational Methods and their Analysis • Two simplifying assumptions: • Noise is Gaussian (variance can be incorporated into l) • A is linear ´Y Hilbert space

  5. Total Variation TV Regularization • Under the above assumptions we have

  6. Total Variation Mean Value • Technical simplification by eliminating mean value

  7. Total Variation Mean Value • Eliminate mean valueHence, minimum is attained among those functions with mean value c

  8. Total Variation Mean Value • We can minimize a-priori over the mean value and restrict the image to mean value zeroW.r.o.g.

  9. Total Variation Structure of BV0 • Equivalent norm

  10. Total Variation Poincare-Inequality • Proof. Assumedoes not hold. Then for each natural number n there is • such that

  11. Total Variation Poincare-Inequality • Proof (ctd).

  12. Total Variation Poincare-Inequality • Proof (ctd).

  13. Total Variation Dual Space Property • Define

  14. Total Variation Dual Space Property

  15. Total Variation Dual Space Property

  16. Total Variation Dual Space Property

  17. Total Variation Dual Space Property

  18. Total Variation Existence • Basic ingredients of an existence proof are • Sequential lower semicontinuity • Compactness

  19. Total Variation Existence • What is the correct topology ?

  20. Total Variation Lower Semicontinuity • Compactness follows in the weak* topology. • Lower semicontinuity ?

  21. Total Variation Lower Semicontinuity

  22. Total Variation Lower Semicontinuity

  23. Total Variation Lower Semicontinuity • First term: analogous proof implies

  24. Total Variation Existence • Theorem: LetJ be sequentially lower semicontinuous and • be compact. Then there exists a minimum of J • Proof.

  25. Total Variation Existence • Proof (ctd). Due to compactness, there exists a subsequence, again denoted by such that • By lower semicontinuity • Hence, u is a minimizer

  26. Total Variation Uniqueness • Since the total variation is not strictly convex and definitely will not enforce uniqueness, the data term should do Proof:

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