[
1. B. Adcock and R. B. Platte: A mapped polynomial method for high-accuracy approximations on arbitrary grids, SIAM J. Numer. Anal., 54 (2016), 2256–2281.10.1137/15M1023853
]Search in Google Scholar
[
2. R. Archibald, A. Gelb and J. Yoon: Polynomial Fitting for Edge Detection in Irregularly Sampled Signals and Images, SIAM J. Numer. Anal., 43(1) (2005), 259–279.10.1137/S0036142903435259
]Search in Google Scholar
[
3. J.-P. Berrut, S. De Marchi, G. Elefante and F. Marchetti: Treating the Gibbs phenomenon in barycentric rational interpolation and approximation via the S-Gibbs algorithm, Appl. Math. Letters, 103 (2020), 106196.10.1016/j.aml.2019.106196
]Search in Google Scholar
[
4. J.-P. Berrut and G. Elefante: A periodic map for linear barycentric rational trigonometric interpolation, Appl. Math. Comput., 371 (2020), 124924.10.1016/j.amc.2019.124924
]Search in Google Scholar
[
5. J.-P. Berrut and L. N. Trefethen: Barycentric Lagrange interpolation, SIAM Rev., 46(3) (2004), 501–517.10.1137/S0036144502417715
]Search in Google Scholar
[
6. L. Bos, S. De Marchi, M. Vianello and Y. Xu: Bivariate Lagrange interpolation at the Padua points: the ideal theory approach, Numer. Math., 108(1) (2007), 43-57.10.1007/s00211-007-0112-z
]Search in Google Scholar
[
7. L. Bos, S. De Marchi, A. Sommariva and M. Vianello: Computing multivariate Fekete and Leja points by numerical linear algebra, SIAM J. Numer. Anal., 48 (2010), 1984–1999.10.1137/090779024
]Search in Google Scholar
[
8. L. Brutman, Lebesgue functions for polynomial interpolation: a survey, Ann. Numer. Math., 4 (1997), 111–127.
]Search in Google Scholar
[
9. CAA Padova-Verona Research Group on Constructive Approximation webpage: https://sites.google.com/view/caa-padova-verona/home
]Search in Google Scholar
[
10. M. Caliari, S. De Marchi and M. Vianello: Bivariate polynomial interpolation on the square at new nodal sets, Appl. Math. Comput., 165(2) (2005), 261–274.10.1016/j.amc.2004.07.001
]Search in Google Scholar
[
11. J. Canny: A Computational Approach to Edge Detection, IEEE Transactions on Pattern Analysis and Machine Intelligence, vol. PAMI-8(6) (1986), 679–698.10.1109/TPAMI.1986.4767851
]Search in Google Scholar
[
12. P. Davis: Interpolation and Approximation, Blaisdell Pub Company, New York (1963).
]Search in Google Scholar
[
13. C. de Boor: A Practical Guide to Splines, revised edition, Springer, New York (2001).
]Search in Google Scholar
[
14. S. De Marchi, G. Elefante and F. Marchetti: Stable discontinuous mapped bases: the Gibbs-Runge-Avoiding Stable Polynomial Approximation (GRASPA) method, Comput. Appl. Math., 40 (2021), 299.10.1007/s40314-021-01688-z
]Search in Google Scholar
[
15. S. De Marchi, G. Elefante, E. Perracchione and D. Poggiali: Quadrature at fake nodes, Dolomites Res. Notes Approx., 14 (2021), Special Issue MATA2020, 39–45.
]Search in Google Scholar
[
16. S. De Marchi, F. Marchetti, E. Perracchione and D. Poggiali: Polynomial interpolation via mapped bases without resampling, J. Comput. Appl. Math., 364 (2020), 112347.10.1016/j.cam.2019.112347
]Search in Google Scholar
[
17. S. De Marchi, W. Erb, E. Francomano, F. Marchetti, E. Perracchione and D. Poggiali: Fake Nodes approximation for Magnetic Particle Imaging, 2020 IEEE 20th Mediterranean Electrotechnical Conference (MELECON), 434–438.10.1109/MELECON48756.2020.9140583
]Search in Google Scholar
[
18. S. De Marchi, W. Erb and F. Marchetti: Lissajous sampling and spectral filtering in MPI applications: the reconstruction algorithm for reducing the Gibbs phenomenon, Proceedings of SampTA 2017, 580–584.10.1109/SAMPTA.2017.8024375
]Search in Google Scholar
[
19. S. De Marchi, F. Marchetti, E. Perracchione and D. Poggiali: Multivariate approximation at fake nodes, Appl. Math. Comput. 391 (2021), 125628.10.1016/j.amc.2020.125628
]Search in Google Scholar
[
20. S. De Marchi, F. Marchetti, E. Perracchione and M. Rossini: Shape-Driven Interpolation with Discontinuous Kernels: Error Analysis, Edge Extraction and Applications in MPI, SIAM J. Sci. Comput., 42(2) (2020), B472–B491.10.1137/19M1248777
]Search in Google Scholar
[
21. F. Dell’Accio, F. Di Tommaso and F. Nudo: Generalizations of the constrained mock-Chebyshev least squares in two variables: Tensor product vs total degree polynomial interpolation, Appl. Math. Letters, 2022, 125, 107732.10.1016/j.aml.2021.107732
]Search in Google Scholar
[
22. W. Erb, C. Kaethner, P. Dencker, M. Ahlborg: A survey on bivariate Lagrange interpolation on Lissajous nodes, Dolomites Res. Notes Approx., 8 (2015), Special issue, 23-36.
]Search in Google Scholar
[
23. M. S. Floater and K. Hormann: Barycentric rational interpolation with no poles and high rates of approximation, Numer. Math., 107(2) (2007), 315–331.10.1007/s00211-007-0093-y
]Search in Google Scholar
[
24. J. W. Gibbs: Fourier’s Series, Nature 59 (1898).10.1038/059200b0
]Search in Google Scholar
[
25. D. Kosloff and H. Tal-Ezer: A modified Chebyshev pseudospectral method with an O(N−1) time step restriction, J. Comput. Phys., 104 (1993), 457–469.10.1006/jcph.1993.1044
]Search in Google Scholar
[
26. Y. Nakatsukasa, O. S`ete and L. N. Trefethen: The AAA algorithm for rational approximation, SIAM J. Sci. Comput., 40 (2018), A1494–A1522.10.1137/16M1106122
]Search in Google Scholar
[
27. D. Poggiali, D. Cecchin and S. De Marchi: Reducing the Gibbs effect in multimodal medical imaging by the Fake Nodes Approach, ResearchGate 10.13140/RG.2.2.21268.99207 (2022), submitted.10.1016/j.jcmds.2022.100040
]Search in Google Scholar
[
28. L. Romani, M. Rossini and D. Schenone: Edge detection methods based on RBF interpolation, J. Comput. Applied Math., 349 (2019), 532–547.10.1016/j.cam.2018.08.006
]Search in Google Scholar
[
29. C. Runge, Über empirische Funktionen und die Interpolation zwischen ¨aquidistanten Ordinaten, Zeit. Math. Phys., 46 (1901), 224–243.
]Search in Google Scholar
[
30. S. A. Sarra and Y. Bai: A rational radial basis function method for accurately resolving discontinuities and steep gradients, Appl. Numer. Math., 130 (2018), 131–142.10.1016/j.apnum.2018.04.001
]Search in Google Scholar
[
31. L. N. Trefethen: Approximation Theory and Approximation Practice, SIAM, 2013.
]Search in Google Scholar
[
32. T. Wenzel, G. Santin and B. Haasdonk: A novel class of stabilized greedy kernel approximation algorithms: Convergence, stability and uniform point distribution, J. Approx. Theory, 262 (2021), 105508.10.1016/j.jat.2020.105508
]Search in Google Scholar
