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The square root of a positive self-adjoint operator

Published online by Cambridge University Press:  09 April 2009

S. J. Bernau
Affiliation:
University of Otago Dunedin, New Zealand
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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.

Type
Research Article
Copyright
Copyright © Australian Mathematical Society 1968

References

[1]Bernau, S. J., ‘The spectral theorem for unbounded normal operators’, Pacific J. Math. 19 (1966), 391406.CrossRefGoogle 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).CrossRefGoogle Scholar
[6]Wouk, A., ‘A note on square roots of positive operators’, SIAM Rev. 8 (1966), 100102.CrossRefGoogle Scholar