Standard

Finite-dimensional de branges subspaces generated by majorants. / Baranov, Anton; Woracek, Harald.

Spectral Theory in Inner Product Spaces and Applications - 6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006. ed. / Jussi Behrndt; Karl-Heinz Förster; Heinz Langer; Carsten Trunk. Springer Nature, 2008. p. 37-48 (Operator Theory: Advances and Applications; Vol. 188).

Research output: Chapter in Book/Report/Conference proceedingConference contributionResearchpeer-review

Harvard

Baranov, A & Woracek, H 2008, Finite-dimensional de branges subspaces generated by majorants. in J Behrndt, K-H Förster, H Langer & C Trunk (eds), Spectral Theory in Inner Product Spaces and Applications - 6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006. Operator Theory: Advances and Applications, vol. 188, Springer Nature, pp. 37-48, 6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006, Berlin, Germany, 14/12/06. https://doi.org/10.1007/978-3-7643-8911-6_3

APA

Baranov, A., & Woracek, H. (2008). Finite-dimensional de branges subspaces generated by majorants. In J. Behrndt, K-H. Förster, H. Langer, & C. Trunk (Eds.), Spectral Theory in Inner Product Spaces and Applications - 6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006 (pp. 37-48). (Operator Theory: Advances and Applications; Vol. 188). Springer Nature. https://doi.org/10.1007/978-3-7643-8911-6_3

Vancouver

Baranov A, Woracek H. Finite-dimensional de branges subspaces generated by majorants. In Behrndt J, Förster K-H, Langer H, Trunk C, editors, Spectral Theory in Inner Product Spaces and Applications - 6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006. Springer Nature. 2008. p. 37-48. (Operator Theory: Advances and Applications). https://doi.org/10.1007/978-3-7643-8911-6_3

Author

Baranov, Anton ; Woracek, Harald. / Finite-dimensional de branges subspaces generated by majorants. Spectral Theory in Inner Product Spaces and Applications - 6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006. editor / Jussi Behrndt ; Karl-Heinz Förster ; Heinz Langer ; Carsten Trunk. Springer Nature, 2008. pp. 37-48 (Operator Theory: Advances and Applications).

BibTeX

@inproceedings{b78d8f3c038f44bd88177b88f543c9a4,
title = "Finite-dimensional de branges subspaces generated by majorants",
abstract = "If H(E) is a de Branges space and ω is a nonnegative function on ℝ, define a de Branges subspace of H(E) by (formula presented). It is known that one-dimensional de Branges subspaces generated in this way are related to minimal majorants. We investigate finite-dimensional de Branges subspaces, their representability in terms of majorants, and their relation to minimal majorants.",
keywords = "Admissible majorant, Beurling-Malliavin Theorem, De branges subspace",
author = "Anton Baranov and Harald Woracek",
year = "2008",
month = jan,
day = "1",
doi = "10.1007/978-3-7643-8911-6_3",
language = "English",
isbn = "9783764389109",
series = "Operator Theory: Advances and Applications",
publisher = "Springer Nature",
pages = "37--48",
editor = "Jussi Behrndt and Karl-Heinz F{\"o}rster and Heinz Langer and Carsten Trunk",
booktitle = "Spectral Theory in Inner Product Spaces and Applications - 6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006",
address = "Germany",
note = "6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006 ; Conference date: 14-12-2006 Through 17-12-2006",

}

RIS

TY - GEN

T1 - Finite-dimensional de branges subspaces generated by majorants

AU - Baranov, Anton

AU - Woracek, Harald

PY - 2008/1/1

Y1 - 2008/1/1

N2 - If H(E) is a de Branges space and ω is a nonnegative function on ℝ, define a de Branges subspace of H(E) by (formula presented). It is known that one-dimensional de Branges subspaces generated in this way are related to minimal majorants. We investigate finite-dimensional de Branges subspaces, their representability in terms of majorants, and their relation to minimal majorants.

AB - If H(E) is a de Branges space and ω is a nonnegative function on ℝ, define a de Branges subspace of H(E) by (formula presented). It is known that one-dimensional de Branges subspaces generated in this way are related to minimal majorants. We investigate finite-dimensional de Branges subspaces, their representability in terms of majorants, and their relation to minimal majorants.

KW - Admissible majorant

KW - Beurling-Malliavin Theorem

KW - De branges subspace

UR - http://www.scopus.com/inward/record.url?scp=84871371362&partnerID=8YFLogxK

U2 - 10.1007/978-3-7643-8911-6_3

DO - 10.1007/978-3-7643-8911-6_3

M3 - Conference contribution

AN - SCOPUS:84871371362

SN - 9783764389109

T3 - Operator Theory: Advances and Applications

SP - 37

EP - 48

BT - Spectral Theory in Inner Product Spaces and Applications - 6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006

A2 - Behrndt, Jussi

A2 - Förster, Karl-Heinz

A2 - Langer, Heinz

A2 - Trunk, Carsten

PB - Springer Nature

T2 - 6th Workshop on Operator Theory in Krein Spaces and Operator Polynomials, 2006

Y2 - 14 December 2006 through 17 December 2006

ER -

ID: 62180250