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Some continuity properties of linear transformations in normed spaces

Published online by Cambridge University Press:  18 May 2009

R. W. Cross
Affiliation:
University of Cape Town, Rondebosch, South Africa
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Let X and Y be normed spaces and let L(X, Y) denote the set of linear transformations (henceforth called “operators”) T with domain a linear subspace D(T) of X and range R(T) contained in Y. The restriction of T to a subspace E is denoted by T/E; by the usual convention T|E = T|ED(T). For a given linear subspace E the family of infinite dimensional ssubspaces of E is denoted by (E). An operator Tis said to have a certain property ℙ ubiquitously if every E(X) contains an F ∈(E) for which T|F has property ℙ For example, T is ubiquitously continuous if each E ∈(X) contains an F∈ (E) for which T|F is continuous. In the present note we shall characterize ubiquitous continuity, isomorphy, precompactness and smallness. A subspace of X is called a principal subspace if it is closed and of finite codimension in X. The restriction of an operator to a principal subspace will be called a principal restriction. The symbol T will always denote an arbitrary operator in L(X, Y).

Type
Research Article
Copyright
Copyright © Glasgow Mathematical Journal Trust 1988

References

1.Drewnowski, L., Some characterisations of semi-Fredholm operators, Comment. Math. Prace. Mat. 24 (1984), 215218.Google Scholar
2.Drewnowski, L., Any two norms are somewhere comparable, Fund. Approx. Comment. Math. 7 (1979), 1314.Google Scholar
3.Goldberg, S., Unbounded linear operators, (McGraw-Hill, 1966).Google Scholar
4.Kato, T., Perturbation theory for nullity, deficiency and other quantities of linear operators, Analyse Math. 6 (1958), 261322.CrossRefGoogle Scholar