Title :
Compressibility of symmetric-α-stable processes
Author :
Ward, John Paul ; Fageot, Julien ; Unser, Michael
Author_Institution :
Biomed. Imaging Group, Ecole Polytech. Fed. de Lausanne, Lausanne, Switzerland
Abstract :
Within a deterministic framework, it is well known that n-term wavelet approximation rates of functions can be deduced from their Besov regularity. We use this principle to determine approximation rates for symmetric-α-stable (SαS) stochastic processes. First, we characterize the Besov regularity of SαS processes. Then the n-term approximation rates follow. To capture the local smoothness behavior, we consider sparse processes defined on the circle that are solutions of stochastic differential equations.
Keywords :
approximation theory; compressibility; differential equations; stochastic processes; wavelet transforms; Besov regularity; deterministic framework; local smoothness behavior; n-term wavelet approximation function rates; sparse processes; stochastic differential equations; symmetric-α-stable process compressibility; Approximation methods; Biological system modeling; Random variables; Stochastic processes; Wavelet domain; Wavelet transforms; White noise;
Conference_Titel :
Sampling Theory and Applications (SampTA), 2015 International Conference on
Conference_Location :
Washington, DC
DOI :
10.1109/SAMPTA.2015.7148887
