prof. dr hab. Anna Kamont
Employment
Keywords Help
- marcinkiewicz average · smooth orthogonal projection · hestenes operator · parseval frame
- riemannian manifold · hestenes operator · smooth decomposition of identity · wavelet frame · triebel-lizorkin space
- riemannian manifold · hestenes operator · smooth orthogonal projection · latitudinal projection · smooth decomposition of identity · morse function · sobolev space
Contact
- annkamon@pg.edu.pl
Publication showcase
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Smooth Orthogonal Projections on Riemannian Manifold
We construct a decomposition of the identity operator on a Riemannian manifold M as a sum of smooth orthogonal projections subordinate to an open cover of M. This extends a decomposition on the real line by smooth orthogonal projection due to Coifman and Meyer (C. R. Acad. Sci. Paris, S´er. I Math., 312(3), 259–261 1991) and Auscher, Weiss, Wickerhauser (1992), and a similar decomposition when M is the sphere by Bownik and Dziedziul (Const....
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Parseval Wavelet Frames on Riemannian Manifold
We construct Parseval wavelet frames in L 2 (M) for a general Riemannian manifold M and we show the existence of wavelet unconditional frames in L p (M) for 1 < p < ∞. This is made possible thanks to smooth orthogonal projection decomposition of the identity operator on L 2 (M), which was recently proven by Bownik et al. (Potential Anal 54:41–94, 2021). We also show a characterization of Triebel–Lizorkin F sp,q (M) and Besov B...
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Marcinkiewicz Averages of Smooth Orthogonal Projections on Sphere
We construct a single smooth orthogonal projection with desired localization whose average under a group action yields the decomposition of the identity operator. For any full rank lattice \Gamma ⊂ R^d , a smooth projection is localized in a neighborhood of an arbitrary precompact fundamental domain R^d / \Gamma. We also show the existence of a highly localized smooth orthogonal projection, whose Marcinkiewicz average under the...
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