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Árpád Bényi, Tadahiro Oh, The Sobolev inequality on the torus revisited , Publ · 2013 · arXiv 2013.5529

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Sharp regularity of a weighted Sobolev space over $ \mathbb{T}^n $ and its relation to finitely differentiable KAM theory

math.DS · 2026-04-06 · unverdicted · novelty 5.0

A weighted Sobolev space on the torus has sharp regularity that lets KAM theory apply to perturbations with classical differentiability only up to floor(n/2) while higher weak derivatives remain unbounded.

Uncertainty Principles for Fourier Multipliers

math.FA · 2019-07-20 · unverdicted · novelty 4.0

Quantifies admissible Sobolev regularity for functions with zeros whose reciprocals are (p,q)-multipliers and refines Balian-Low uncertainty principles via connections to Gabor and shift-invariant systems.

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Sharp regularity of a weighted Sobolev space over $ \mathbb{T}^n $ and its relation to finitely differentiable KAM theory math.DS · 2026-04-06 · unverdicted · none · ref 4
A weighted Sobolev space on the torus has sharp regularity that lets KAM theory apply to perturbations with classical differentiability only up to floor(n/2) while higher weak derivatives remain unbounded.
Uncertainty Principles for Fourier Multipliers math.FA · 2019-07-20 · unverdicted · none · ref 9
Quantifies admissible Sobolev regularity for functions with zeros whose reciprocals are (p,q)-multipliers and refines Balian-Low uncertainty principles via connections to Gabor and shift-invariant systems.

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