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Homomorphisms Between Algebras of Continuous Functions

Published online by Cambridge University Press:  20 November 2018

J. G. Llavona  and
J. A. Jaramillo
J. G. Llavona
Affiliation:
Universidad Complutense, Madrid, Spain
J. A. Jaramillo
Affiliation:
Universidad Complutense, Madrid, Spain
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We are concerned in this paper with the study of homomorphisms between different algebras of continuous functions, especially the algebras of real functions which are either weakly continuous on bounded sets or weakly uniformly continuous on bounded sets on a Banach space (see definitions below).

These spaces of weakly [uniformly] continuous functions appeared in relation with some questions in Infinite-dimensional Approximation Theory (see [4], [6], [11], [12], [13] and [16]); and since the structure of these function spaces is closely related with properties of different weak topologies (the bounded-weak and bounded-weak* topologies, respectively) and with the structure of Banach spaces on which they are defined, their study also presents interest from the point of view of Banach space theory, as can be seen in [2], [12] or [17].

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 41 , Issue 1 , 01 February 1989 , pp. 132 - 162
Copyright
Copyright © Canadian Mathematical Society 1989

References

1. Arens, R., Extension of functions on fully normal spaces, Pac. J. Math. 2 (1952), 1122.Google Scholar
2. Aron, R., Diestel, J., and Rajappa, A.K., A characterization of Banach spaces containing l1 in Banach spaces, Proc. of the Missouri Conference (Lecture Notes in Math. 1166, 1985), 13.Google Scholar
3. Aron, R., Gómez, J., and Llavona, J., Homomorphisms between algebras of differentiable functions in infinite dimensions, Mich. Math. Journal 35 (1988), 163178.Google Scholar
4. Aron, R., Hervés, C. and Valdivia, M., Weakly continuous mapping on Banach spaces, J. Funct. Anal. 52 (1983), 189203.Google Scholar
5. Aron, R. and Llavona, J., Composition of weakly uniformly continuous functions, Proc. Roy. Irish Acad. 88A (1988), 2933.Google Scholar
6. Aron, R. and Prolla, J.B., Polynomial approximation of differentiable functions on Banach spaces, J. Reine Ang. Math. 313 (1980), 195216.Google Scholar
7. Beckenstein, E., Narici, L. and Suffel, C., Topological algebras (North Holland Math. Studies 24, 1977).Google Scholar
8. Bierstone, R. and Schwartz, G., Continuous linear division and extension of C functions, Duke Math. J. 50 (1983), 233271.Google Scholar
9. Corson, H.H., The weak topology of a Banach space, Trans. A.M.S. 101 (1961), 15.Google Scholar
10. Ferrera, J., Un ejemplo de un espacio que no es bw-realcompacto, Actes du 6e Congres du Group, de Math. d'Expr. Latine, 363365.Google Scholar
11. Ferrera, J., Espacios de funciones débilmente continuas sobre espacios de Banach, Tesis Doctoral. Universidad Complutense de Madrid (1980).Google Scholar
12. Ferrera, J., Spaces of weakly continuous functions, Pac. J. Math. 102 (1982), 285291.Google Scholar
13. Ferrera, J., Gómez, J. and Llavona, J., On completion of spaces of weakly continuous functions, Bull. London Math. Soc. 75 (1983), 260264.Google Scholar
14. Galé, J.E., Gelfand theory in algebras of differ entiable functions on Banach spaces, Pac. J. Math. 119 (1985), 303315.Google Scholar
15. Gillman, L. and Jerison, M., Rings of continuous functions (Van Nostrand, 1960).Google Scholar
16. Gómez, J. and Llavona, J., Polynomial approximation of weakly differentiable functions on Banach spaces, Proc. Roy. Irish Acad. 82A (1982), 141150.Google Scholar
17. Gómez, J., On local convexity of bounded-weak topologies on Banach spaces, Pac. J. Math. 110 (1984), 7176.Google Scholar
18. Husain, T., Multiplicative functional on topological algebras, Research notes in Math. 85 (Pitman, 1983).Google Scholar
19. Larsen, R., Functional analysis. An introduction (Marcel Dekker).Google Scholar
20. Llavona, J., Approximation of continuously differ entiable functions (North-Holland Math. Studies 130, 1986).Google Scholar
21. Michael, E.A., Locally multiplicatively-convex topological algebras, Memoirs A.M.S. 11 (1952).Google Scholar
22. Rosenthal, H.P., Some recent discoveries in the isomorphic theory of Banach spaces, Bull. A.M.S. 84 (1978), 803831.Google Scholar
23. Singer, I., Bases in Banach spaces, I (Springer-Verlag, 1970).Google Scholar
24. Talagrand, M., Sur les espaces de Banach contenant 11(τ), Israel J. Math. 40 (1981), 324330.Google Scholar