Ubertino Battisti, Michele Berra, Anita Tabacco
Published 2016-05-27Version 1
We construct a family of frames describing Sobolev norm and Sobolev seminorm of the space $H^s(\mathbb{R}^d)$. Our work is inspired by the Discrete Orthonormal Stockwell Transform introduced by R.G. Stockwell, which provides a time-frequency localized version of Fourier basis of $L^2([0,1])$. This approach is a hybrid between Gabor and Wavelet frames. We construct explicit and computable examples of these frames, discussing their properties.
Comments: 28 pages, 8 figures
Continuity of composition operators in Sobolev spaces
Nguyen's approach to Sobolev spaces in metric measure spaces with unique tangents
Profile decomposition in Sobolev spaces and decomposition of integral functionals I: inhomogeneous case
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