On the distribution of Fekete points

T. Kövari; Ch. Pommerenke

doi:10.1112/S0025579300002400

Extract

Let E be a continuum and n ≥ 4 a given positive integer. A system of points z1,…, zn єE that maximizes

is called a system of Fekete points. Such a system may be not unique.

References

1.Alper, S. Y., “On the uniform approximation of functions of a complex variable in closed domains” (Russian), Izv. Akad. Nauk SSSR, Ser. Mat., 19 (1955), 423–444.Google Scholar

2.Alper, S. Y., “On the convergence of Lagrange interpolation polynomials in the complex domain” (Russian), Uspekhi Mat. Nauk, Vol. XI, 5, 44–49.Google Scholar

3.Erdös, P. and Turan, P., “On interpolation II”, Annals of Math., 39 (1938), 703–724.Google Scholar

4.Pommerenke, Ch., “On the derivative of a polynomial”, Michigan Math. J., 6 (1959), 373–375.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Pommerenke, Ch. 1969. �ber die Verteilung der Fekete-Punkte II. Mathematische Annalen, Vol. 179, Issue. 3, p. 212.

Kövari, T. 1971. On the distribution of Fekete points II. Mathematika, Vol. 18, Issue. 1, p. 40.

Korevaar, Jacob 1974. Equilibrium distributions of electrons on roundish plane conductors. II. Indagationes Mathematicae (Proceedings), Vol. 77, Issue. 5, p. 438.

Dahlberg, Björn E. J. 1978. On the distribution of Fekete points. Duke Mathematical Journal, Vol. 45, Issue. 3,

Korevaar, J. and Kortram, R.A. 1983. Equilibrium distributions of electrons on smooth plane conductors. Indagationes Mathematicae (Proceedings), Vol. 86, Issue. 2, p. 203.

Kövari, Thomas 1984. Rational Approximation and Interpolation. Vol. 1105, Issue. , p. 249.

Korevaar, J. and Monterie, M.A. 2001. Fekete Potentials and Polynomials for Continua. Journal of Approximation Theory, Vol. 109, Issue. 1, p. 110.

Andrievskii, Vladimir V. and Blatt, Hans-Peter 2002. Discrepancy of Signed Measures and Polynomial Approximation. p. 225.

Erdélyi, Tamás 2006. A Panorama of Hungarian Mathematics in the Twentieth Century I. Vol. 14, Issue. , p. 119.

Bos, Len Levenberg, Norm and Waldron, Shayne 2008. On the spacing of Fekete points for a sphere, ball or simplex. Indagationes Mathematicae, Vol. 19, Issue. 2, p. 163.

Sommariva, Alvise and Vianello, Marco 2009. Computing approximate Fekete points by QR factorizations of Vandermonde matrices. Computers & Mathematics with Applications, Vol. 57, Issue. 8, p. 1324.

Calvi, Jean-Paul and Phung Van, Manh 2011. On the Lebesgue constant of Leja sequences for the unit disk and its applications to multivariate interpolation. Journal of Approximation Theory, Vol. 163, Issue. 5, p. 608.

Białas-Cież, Leokadia and Calvi, Jean-Paul 2012. Pseudo Leja sequences. Annali di Matematica Pura ed Applicata, Vol. 191, Issue. 1, p. 53.

Ahmad, Rizwan Xue, Hui Giri, Shivraman Ding, Yu Craft, Jason and Simonetti, Orlando P. 2015. Variable density incoherent spatiotemporal acquisition (VISTA) for highly accelerated cardiac MRI. Magnetic Resonance in Medicine, Vol. 74, Issue. 5, p. 1266.

Lux, Thomas C. H. Watson, Layne T. Chang, Tyler H. Hong, Yili and Cameron, Kirk 2021. Interpolation of sparse high-dimensional data. Numerical Algorithms, Vol. 88, Issue. 1, p. 281.

Irigoyen, Amadeo 2021. Multidimensional intertwining Leja sequences and applications in bidimensional Lagrange interpolation. Journal of Approximation Theory, Vol. 264, Issue. , p. 105540.

Article contents

On the distribution of Fekete points

Extract

Access options

References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

On the distribution of Fekete points

Extract

Access options

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests