$L^p$ improving estimates for some classes of Radon transforms
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Publication:5461367
DOI10.1090/S0002-9947-05-03807-9zbMath1074.44002OpenAlexW1513958767MaRDI QIDQ5461367
Publication date: 26 July 2005
Published in: Transactions of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1090/s0002-9947-05-03807-9
Related Items (8)
The \(L^{p} \rightarrow L^{q}\) estimates for degenerate Radon transforms in \(\mathbb{C}^2\) ⋮ Sharp \(L^{p}\)-boundedness of oscillatory integral operators with polynomial phases ⋮ Uniform sublevel Radon-like inequalities ⋮ Sharp Bounds for Oscillatory Integral Operators with Homogeneous Polynomial Phases ⋮ Endpoint estimates for one-dimensional oscillatory integral operators ⋮ \(L^p\) decay estimates for weighted oscillatory integral operators on \(\mathbb R\) ⋮ Uniform estimates for damped Radon transform on the plane ⋮ Damping estimates for oscillatory integral operators with real-analytic phases and its applications
Cites Work
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- Hilbert transforms along curves. II: A flat case
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- The Newton polyhedron and oscillatory integral operators
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- Models of degenerate Fourier integral operators and Radon transforms
- An \(L^p-L^q\) estimate for Radon transforms associated to polynomials
- Radon transforms and finite type conditions
- Sharp \(L^2\) bounds for oscillatory integral operators with \(C^\infty\) phases
- Endpoint \(L^p-L^q\) estimates for degenerate Radon transforms in \(\mathbb R^2\) associated with real-analytic functions
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