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Isomorphisms between spaces of vector-valued continuous functions

Published online by Cambridge University Press:  20 January 2009

N. J. Kalton
N. J. Kalton
Affiliation:
Department of Mathematics, University of Missouri, Columbia, MO 65211
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A theorem due to Milutin [12] (see also [13]) asserts that for any two uncountable compact metric spaces Ω1 and Ω2 the spaces of continuous real-valued functions C1) and C2) are linearly isomorphic. It immediately follows from consideration of tensor products that if X is any Banach space then C1;X) and C2;X) are isomorphic.

Type
Research Article
Information
Proceedings of the Edinburgh Mathematical Society , Volume 26 , Issue 1 , February 1983 , pp. 29 - 48
Copyright
Copyright © Edinburgh Mathematical Society 1983

References

REFERENCES

1.Batt, J. and Berg, E. J., Linear bounded transformation on the space of continuous functions, J. Functional Analysis 4 (1969), 215239.CrossRefGoogle Scholar
2.Brooks, J. K. and Lewis, P. W., Linear operators and vector measures, Trans. Amer. Math. Soc. 192 (1974), 139162.CrossRefGoogle Scholar
3.Christensen, J. P. R., Some results with relation to the control measure problem, Vector Space Measures and Applications II, Proceedings Dublin 1977 (Springer Lecture Notes No. 645, Berlin-Heidelberg-New York, 1978), 2734.Google Scholar
4.Christensen, J. P. R. and Herer, W., On the existence of pathological sub-measures and theconstruction of exotic groups, Math. Ann. 213 (1975), 203210.Google Scholar
5.Diéstel, J. and Uhl, J. J., Vector Measures (American Math. Soc. Surveys, Providence, 1976).Google Scholar
6.Dobrakov, I., On Submeasures I, Diss, Math. 113 (Warsaw, 1972).Google Scholar
7.Kalton, N. J., Topologies on Riesz groups and applications to measure theory, Proc. London Math. Soc. (3 28 (1974), 253273.CrossRefGoogle Scholar
8.Kalton, N. J., Exhaustive operators and vector measures, Proc. Edinburgh Math. Soc. 19 (1975), 291300.Google Scholar
9.Klee, V.Leray-Schauder theory without local convexity, Math. Ann. 141 (1960), 286296.Google Scholar
10.Kothe, G., Topological Vector Spaces I (Springer-Verlag, Berlin, 1970).Google Scholar
11.Kuratowski, K., Topology Vol. I. (Academic Press, London, 1966).Google Scholar
12.Maharam, D., An algebraic characterization of measure algebras, Ann. Math. 48 (1947), 154157.Google Scholar
13.Milutin, A. A., Isomorphism of spaces of continuous functions on compacta of power continuum, Teoria Fund., Funct. Anal. i. Pril. (Kharkov) 2 (1966), 150156 (in Russian).Google Scholar
14.Pelcyński, A., Linear extensions, linear averagings and their applications to linear topological classification of spaces of continuous functions. Diss. Math. 58 (Warsaw, 1968).Google Scholar
15.Popov, V. A., Additive and subadditive functions on Boolean algebras, Siberian Math. J. 17 (1976), 331339 (in Russian).CrossRefGoogle Scholar
16.Rolewicz, S. and Ryll-Nardzewski, C., On unconditional convergence in linear metric spaces, Coll. Math. 17 (1967), 327331.Google Scholar
17.Schuchat, A. H., Approximation of vector-valued continuous functions, Proc. Amer. Math.Soc. 31 (1972), 97103.Google Scholar
18.Schuchat, A. H., Integral representation theorems in topological vector spaces, Trans. Amer.Math. Soc. 172 (1972), 373397.Google Scholar
19.Thomas, G. E. F., On Radon maps with values in arbitrary topological vector spaces andtheir integral extensions (unpublished manuscript, 1972).Google Scholar
20.Turpin, P., Convexités dan les espaces vectoriel topologiques généraux, Diss. Math. 131 (Warsaw, 1976).Google Scholar
21.Waelbroeck, L., Topological Vector Spaces and Algebras (Springer Lecture Notes 230, Berlin–Heidelberg–New York, 1972).Google Scholar
22.Waelbroeck, L., Topological vector spaces, Summer school on topological vector spaces (Bruxelles 1972) (Springer Lecture Notes 331, Berlin–Heidelberg–New York, 1973), l40.Google Scholar
23.Whyburn, G. T., Topological Analysis (Princeton University Press, Princeton, 1958).Google Scholar