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Reducibility of differential operators some: examples

Published online by Cambridge University Press:  24 October 2008

B. Fishel
Affiliation:
Westfield College, London
N. Denkel
Affiliation:
Westfield College, London

Extract

A symmetric operator on a Hilbert space, with deficiency indices (m; m) has self-adjoint extensions. These are ‘highly reducible’. The original operator may be irreducible, (see example (i), below). Can the mechanism whereby reducibility is achieved be understood? The concrete examples most readily studied are those associated with differential operators. It is easy to obtain operators, associated with a formal linear differential operator, having deficiency indices (m; m). What of reducibility? Nothing seems to be known. In the case of the first-order operator we were able, using the Volterra operator, to establish irreducibility of the associated minimal operator. To investigate symmetric operators associated with a second-order differential operator, different methods had to be developed. They apply also to the first-order operator, and we employ them to demonstrate the irreducibility of the associated minimal operator. In the second-order case the minimal operator proves reducible, and we also exhibit examples of reducibility of associated symmetric operators. It would clearly be of interest to elucidate the influence of the boundary conditions on reducibility.

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 1979

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References

REFERENCES

(1)Akhiezer, N. I. and Glazman, I. M.Theory of linear operators in Hilbert Space, vol. 2 (New York, Frederick Ungar, 1963).Google Scholar
(2)Coddington, E. A.The spectral representation of ordinary self-adjoint differential operators. Ann. of Math. 60 (1954), 192211.CrossRefGoogle Scholar
(3)Dunford, N. and Schwartz, J. T.Linear operators, part II (New York, Interscience, 1963).Google Scholar