The norm of linear extension operators for \(C^{m-1,1}(\mathbb{R}^n)\)
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Publication:2094588
DOI10.1016/j.aim.2022.108698OpenAlexW4297093392MaRDI QIDQ2094588
Jacob Carruth, Abraham Frei-Pearson, Arie Israel
Publication date: 8 November 2022
Published in: Advances in Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2109.03770
Cites Work
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- Quantitative Helly-type theorem for the diameter of convex sets
- The Whitney extension theorem in high dimensions
- The \(C^m\) norm of a function with prescribed jets. I.
- An example related to Whitney extension with almost minimal \(C^m\) norm
- Products of polynomials in many variables
- Whitney's extension problem for \(C^m\)
- \({\mathcal C}^m\)-norms on finite sets and \({\mathcal C}^m\) extension
- Extension of \(C^{m, \omega}\)-smooth functions by linear operators
- Fitting a \(C^m\)-smooth function to data. II
- Traces of functions of Zygmund class
- A coordinate-free proof of the finiteness principle for Whitney's extension problem
- A sharp form of Whitney's extension theorem
- Fitting a \(C^m\)-smooth function to data. I.
- Fitting a \(C^m\)-smooth function to data. III.
- \(C^m\) extension by linear operators
- Interpolation and extrapolation of smooth functions by linear operators
- A generalized sharp Whitney theorem for jets
- Jordan's principal angles in complex vector spaces
- The Whitney extension problem and Lipschitz selections of set-valued mappings in jet-spaces
- Whitney’s extension problems and interpolation of data
- Fitting Smooth Functions to Data
- Unitarily Invariant Metrics on the Grassmann Space
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