A note on normal operators

S. J. Bernau; F. Smithies

doi:10.1017/S0305004100003728

Extract

We recall that a bounded linear operator T in a Hilbert space or finite-dimensional unitary space is said to be normal if T commutes with its adjoint operator T*, i.e. TT* = T*T. Most of the proofs given in the literature for the spectral theorem for normal operators, even in the finite-dimensional case, appeal to the corresponding results for Hermitian or unitary operators.

Crossref Citations

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

Yoshino, Takashi 1965. On the spectrum of a hyponormal operator. Tohoku Mathematical Journal, Vol. 17, Issue. 3,

Whitley, Robert 1968. The Spectral Theorem for a Normal Operator. The American Mathematical Monthly, Vol. 75, Issue. 8, p. 856.

Berberian, S. K. 1970. Some conditions on an operator implying normality. Mathematische Annalen, Vol. 184, Issue. 3, p. 188.

Goldberg, Moshe 1979. On certain finite dimensional numerical ranges and numerical radii†. Linear and Multilinear Algebra, Vol. 7, Issue. 4, p. 329.

Harte, Robin and Searc�id, M�che�l � 1986. Positive elements and theB * condition. Mathematische Zeitschrift, Vol. 193, Issue. 1, p. 1.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 197.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 305.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 257.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 211.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 169.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 3.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 151.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 55.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 341.

Komornik, Vilmos 2016. Lectures on Functional Analysis and the Lebesgue Integral. p. 119.

Garcia, Stephan Ramon Mashreghi, Javad and Ross, William T. 2018. Finite Blaschke Products and Their Connections. p. 209.

Baklouti, Hamadi and Feki, Kais 2020. Commuting Tuples of Normal Operators in Hilbert Spaces. Complex Analysis and Operator Theory, Vol. 14, Issue. 6,

M., Salim Dawood and Eidi, Jaafer Hmood 2021. On (P*-N) quasi normal operators Of order "n" In Hilbert space. Al-Mustansiriyah Journal of Science, Vol. 32, Issue. 1, p. 10.

Mortad, Mohammed Hichem 2022. Counterexamples in Operator Theory. p. 169.

Dietz, Zach Lippitt, William and Sethuraman, Sunder 2023. Stick-Breaking processes, Clumping, and Markov Chain Occupation Laws. Sankhya A, Vol. 85, Issue. 1, p. 129.

Download full list

Article contents

A note on normal operators

Extract

Access options

References

REFERENCES

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

Article contents

A note on normal operators

Extract

Access options

References

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