Extremal Interpolation in the Mean in the Space $$L_1(\mathbb R)$$ with Overlapping Averaging Intervals
From MaRDI portal
Publication:6494794
DOI10.1134/S0001434624010097MaRDI QIDQ6494794
Publication date: 30 April 2024
Published in: Mathematical Notes (Search for Journal in Brave)
Numerical approximation and computational geometry (primarily algorithms) (65Dxx) Approximations and expansions (41Axx) Ordinary differential operators (47Exx)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Some problems of extremal interpolation in the mean for linear differential operators
- Extremal interpolation with least norm of linear differential operator
- A problem of extremal interpolation
- How small can one make the derivatives of an interpolating function?
- Extremal problems of functional interpolation and interpolation-in-the- mean splines
- Certain linear differential operators and generalized differences
- Extremal functional interpolation in the mean with least value of the \(n\)th derivative for large averaging intervals
- Interpolation by functions with \(n\)th derivative of minimum norm
- \(H^{m,p}\)-extensions by \(H^{m,p}\)-splines
- Extremal interpolation in the mean with overlapping averaging intervals and L -splines
- Extremal $ L_p$ interpolation in the mean with intersecting averaging intervals
This page was built for publication: Extremal Interpolation in the Mean in the Space $$L_1(\mathbb R)$$ with Overlapping Averaging Intervals
