The Equivalence of Fourier-based and Wasserstein Metrics on Imaging Problems
Auricchio, Gennaro, Codegoni, Andrea, Gualandi, Stefano, Toscani, Giuseppe, Veneroni, Marco
We investigate properties of some extensions of a class of Fourier-based probability metrics, originally introduced to study convergence to equilibrium for the solution to the spatially homogeneous Boltzmann equation. At difference with the original one, the new Fourier-based metrics are well-defined also for probability distributions with different centers of mass, and for discrete probability measures supported over a regular grid. Among other properties, it is shown that, in the discrete setting, these new Fourier-based metrics are equivalent either to the Euclidean-Wasserstein distance $W_2$, or to the Kantorovich-Wasserstein distance $W_1$, with explicit constants of equivalence. Numerical results then show that in benchmark problems of image processing, Fourier metrics provide a better runtime with respect to Wasserstein ones.
May-13-2020
- Country:
- Europe > Italy (0.04)
- North America > United States
- South Carolina > Charleston County
- North Charleston (0.04)
- Charleston (0.04)
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- Research Report (0.50)
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