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Biquasitriangular operators have strongly irreducible perturbations.

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Biquasitriangular operators have strongly irreducible perturbations. / Jiang, Chun Lan; Power, Stephen C.; Wang, Zong Yao.
In: The Quarterly Journal of Mathematics, Vol. 51, No. 3, 09.2000, p. 353-369.

Research output: Contribution to Journal/MagazineJournal articlepeer-review

Harvard

Jiang, CL, Power, SC & Wang, ZY 2000, 'Biquasitriangular operators have strongly irreducible perturbations.', The Quarterly Journal of Mathematics, vol. 51, no. 3, pp. 353-369. https://doi.org/10.1093/qjmath/51.3.353

APA

Jiang, C. L., Power, S. C., & Wang, Z. Y. (2000). Biquasitriangular operators have strongly irreducible perturbations. The Quarterly Journal of Mathematics, 51(3), 353-369. https://doi.org/10.1093/qjmath/51.3.353

Vancouver

Jiang CL, Power SC, Wang ZY. Biquasitriangular operators have strongly irreducible perturbations. The Quarterly Journal of Mathematics. 2000 Sept;51(3):353-369. doi: 10.1093/qjmath/51.3.353

Author

Jiang, Chun Lan ; Power, Stephen C. ; Wang, Zong Yao. / Biquasitriangular operators have strongly irreducible perturbations. In: The Quarterly Journal of Mathematics. 2000 ; Vol. 51, No. 3. pp. 353-369.

Bibtex

@article{18cdfd79fa2240dc8181d90f3654b23a,
title = "Biquasitriangular operators have strongly irreducible perturbations.",
abstract = "We prove that if T is a biquasitriangular operator on a Hilbert space H with connected spectrum then T may be approximated by a strongly irreducible operator S with S _ T compact and small.",
author = "Jiang, {Chun Lan} and Power, {Stephen C.} and Wang, {Zong Yao}",
year = "2000",
month = sep,
doi = "10.1093/qjmath/51.3.353",
language = "English",
volume = "51",
pages = "353--369",
journal = "The Quarterly Journal of Mathematics",
issn = "0033-5606",
publisher = "Oxford University Press",
number = "3",

}

RIS

TY - JOUR

T1 - Biquasitriangular operators have strongly irreducible perturbations.

AU - Jiang, Chun Lan

AU - Power, Stephen C.

AU - Wang, Zong Yao

PY - 2000/9

Y1 - 2000/9

N2 - We prove that if T is a biquasitriangular operator on a Hilbert space H with connected spectrum then T may be approximated by a strongly irreducible operator S with S _ T compact and small.

AB - We prove that if T is a biquasitriangular operator on a Hilbert space H with connected spectrum then T may be approximated by a strongly irreducible operator S with S _ T compact and small.

U2 - 10.1093/qjmath/51.3.353

DO - 10.1093/qjmath/51.3.353

M3 - Journal article

VL - 51

SP - 353

EP - 369

JO - The Quarterly Journal of Mathematics

JF - The Quarterly Journal of Mathematics

SN - 0033-5606

IS - 3

ER -