The square root of a positive self-adjoint operator

S. J. Bernau

doi:10.1017/S1446788700004560

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

One elementary proof of the spectral theorem for bounded self-adjoint operators depends on an elementary construction for the square root of a bounded positive self-adjoint operator. The purpose of this paper is to give an elementary construction for the unbounded case and to deduce the spectral theorem for unbounded self-adjoint operators. In so far as all our results are more or less immediate consequences of the spectral theorem there is little is entirely new. On the other hand the elementary approach seems to the author to provide a deeper insight into the structure of the problem and also leads directly to the spectral theorem without appealing first to the bounded case. Besides this, our methods for proving uniqueness of the square root and of the spectral family seem to be new even in the bounded case. In particular there is no need to invoke representation theorems for linear functionals on spaces of continuous functions.

References

[1]Bernau, S. J., ‘The spectral theorem for unbounded normal operators’, Pacific J. Math. 19 (1966), 391–406.CrossRef Google Scholar

[2]Dunford, N. and Schwartz, J. T., Linear operators, Part II, (Interscience, New York, 1963).Google Scholar

[3]Halmos, P. R., Introduction to Hilbert space and the theory of spectral multiplicity (2nd. edition, Chelsea, New York, 1957).Google Scholar

[4]Riesz, F. and Nagy, B. Sz., Functional Analysis, (Ungar, New York, 1955).Google Scholar

[5]Nagy, B. Sz., Spektraldarstellung linearer Transformationen des Hilbertschen Raumes (Ergebnisse d. Math., Band 5, Springer, Berlin, 1942).CrossRef Google Scholar

[6]Wouk, A., ‘A note on square roots of positive operators’, SIAM Rev. 8 (1966), 100–102.CrossRef Google Scholar

Crossref Citations

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

Bernau, S. J. 1968. An unbounded spectral mapping theorem. Journal of the Australian Mathematical Society, Vol. 8, Issue. 1, p. 119.

Dodds, P. G. 1984. Orthomorphisms of a commutative W*-algebra. Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics, Vol. 37, Issue. 2, p. 143.

Dower, Peter M. and McEneaney, William M. 2013. A fundamental solution for an infinite dimensional two-point boundary value problem via the principle of stationary action. p. 270.

van den Dungen, Koen Paschke, Mario and Rennie, Adam 2013. Pseudo-Riemannian spectral triples and the harmonic oscillator. Journal of Geometry and Physics, Vol. 73, Issue. , p. 37.

Howard, Peter 2014. Spectral analysis for transition front solutions in multidimensional Cahn–Hilliard systems. Journal of Differential Equations, Vol. 257, Issue. 9, p. 3448.

van den Dungen, Koen and Rennie, Adam 2016. Indefinite Kasparov Modules and Pseudo-Riemannian Manifolds. Annales Henri Poincaré, Vol. 17, Issue. 11, p. 3255.

Howard, Peter 2016. Stability of Transition Front Solutions in Multidimensional Cahn–Hilliard Systems. Journal of Nonlinear Science, Vol. 26, Issue. 3, p. 619.

Sebestyén, Zoltán and Tarcsay, Zsigmond 2017. On the square root of a positive selfadjoint operator. Periodica Mathematica Hungarica, Vol. 75, Issue. 2, p. 268.

Bandara, Lashi and Saratchandran, Hemanth 2017. Essential self-adjointness of powers of first-order differential operators on non-compact manifolds with low-regularity metrics. Journal of Functional Analysis, Vol. 273, Issue. 12, p. 3719.

Dower, Peter M. and McEneaney, William M. 2017. Solving Two-Point Boundary Value Problems for a Wave Equation via the Principle of Stationary Action and Optimal Control. SIAM Journal on Control and Optimization, Vol. 55, Issue. 4, p. 2151.

Howard, Peter 2017. Linear Stability for Transition Front Solutions in Multidimensional Cahn–Hilliard Systems. Journal of Dynamics and Differential Equations, Vol. 29, Issue. 3, p. 895.

Mortad, Mohammed Hichem 2019. On the absolute value of the product and the sum of linear operators. Rendiconti del Circolo Matematico di Palermo Series 2, Vol. 68, Issue. 2, p. 247.

Martinou, Andriana Bonatsos, Dennis Minkov, N. Assimakis, I. E. Peroulis, S. K. Sarantopoulou, S. and Cseh, J. 2020. Proxy-SU(3) symmetry in the shell model basis. The European Physical Journal A, Vol. 56, Issue. 9,

Ita, Eyo Eyo Soo, Chopin and Yu, Hoi Lai 2021. Intrinsic time gravity, heat kernel regularization, and emergence of Einstein’s theory. Classical and Quantum Gravity, Vol. 38, Issue. 3, p. 035007.

Applebaum, David and Brockway, Rosemary Shewell 2021. $$L^2$$ Properties of Lévy Generators on Compact Riemannian Manifolds. Journal of Theoretical Probability, Vol. 34, Issue. 2, p. 1029.

Mortad, Mohammed Hichem 2022. The Fuglede-Putnam Theory. Vol. 2322, Issue. , p. 67.

Bolaños-Servín, Jorge R. Quezada, Roberto and Rios-Cangas, Josué I. 2022. Weyl Moments and Quantum Gaussian States. Reports on Mathematical Physics, Vol. 90, Issue. 3, p. 357.

Bredies, Kristian Chenchene, Enis Lorenz, Dirk A. and Naldi, Emanuele 2022. Degenerate Preconditioned Proximal Point Algorithms. SIAM Journal on Optimization, Vol. 32, Issue. 3, p. 2376.

Guo, Xin Lin, Junhong and Zhou, Ding-Xuan 2022. Rates of convergence of randomized Kaczmarz algorithms in Hilbert spaces. Applied and Computational Harmonic Analysis, Vol. 61, Issue. , p. 288.

Contino, Maximiliano Maestripieri, Alejandra and Marcantognini, Stefania 2022. A matrix formula for Schur complements of nonnegative selfadjoint linear relations. Linear Algebra and its Applications, Vol. 654, Issue. , p. 143.

Download full list

Article contents

The square root of a positive self-adjoint operator

Extract

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