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Unilateral quasi-regularizers of closed operators

Published online by Cambridge University Press:  24 October 2008

R. W. Cross
Affiliation:
University of Cape Town

Extract

Let X and Y be normed spaces and let L(X, Y) denote the set of linear transformations from X into Y, with domain D(T) and range R(T). For a given TL(X, Y) we investigate the existence and properties of a closed densely defined operator SL(Y, X) such that STI/D(T) (or TSI/D(S)) is a bounded operator of finite dimensional range. These results were previously announced without proof in (2).

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 1980

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References

REFERENCES

(1)Cross, R. W.Quasi-complementation and the existence of unilateral inverses of closed operators. Notices of the South African Math. Soc. 9 (1977), 75.Google Scholar
(2)Cross, R. W.Quasi-regularizers of closed operators. Math. Colloq. Univ. Cape Town, 11 (1977), 145154.Google Scholar
(3)Cross, R. W.On the continuous linear image of a Banach space. J. Australian Math. Soc. (to appear).Google Scholar
(4)Goldberg, S.Unbounded linear operators (New York, McGraw-Hill, 1966).Google Scholar
(5)Jameson, G. J. O.Topology and normed spaces (London, Chapman & Hall, 1974).Google Scholar
(6)Lin, C-S.Regularizes of closed operators. Canad. Math. Bull. 17 (1974), 6771.Google Scholar
(7)Lindenstrauss, J.On subspaces of Banach spaces without quasi-complements. Israel J. Math. 6 (1968), 3638.CrossRefGoogle Scholar
(8)Nashed, M. Z. and Votruba, G. F.A unified approach to generalized inverses of linear operators. Bull. Amer. Math. Soc. 80 (1974), 825835.Google Scholar
(9)Nieto, J. I.On Fredholm Operators and the essential spectrum of singular integral operators. Math. Ann. 178 (1968), 6277.Google Scholar
(10)Vladimirskiǐ, Ju. N.Strictly cosingular operators. Soviet Math. Dokl. 8 (1967), 739740.Google Scholar