Orthogonal Systems of Spline Wavelets as Unconditional Bases in Sobolev Spaces
We exhibit the necessary range for which functions in the Sobolev spaces L^s_p can be represented as an unconditional sum of orthonormal spline wavelet systems, such as the Battle-Lemarié wavelets. We also consider the natural extensions to Triebel-Lizorkin spaces. This builds upon, and is a generalization of, previous work of Seeger and Ullrich, where analogous results were established for the Haar wavelet system.
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