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Kalton, N. J. Convexity conditions for non-locally convex lattices. Glasgow mathematical journal, Tome 25 (1984) no. 2, pp. 141-152. doi: 10.1017/S0017089500005553
@article{10_1017_S0017089500005553,
author = {Kalton, N. J.},
title = {Convexity conditions for non-locally convex lattices},
journal = {Glasgow mathematical journal},
pages = {141--152},
year = {1984},
volume = {25},
number = {2},
doi = {10.1017/S0017089500005553},
url = {http://geodesic.mathdoc.fr/articles/10.1017/S0017089500005553/}
}
[1] 1.Bennett, G., An extension of the Riesz-Thorin theorem in Banach spaces of analytic functions. Lecture Notes in Mathematics No 604 (Springer-Verlag, 1977). Google Scholar
[2] 2.Bennett, G., Lectures on matrix transformations of ℓp spaces, in Notes in Banach spaces (Lacey, H. E., ed.) (University of Texas Press, Austin, Texas, 1980). Google Scholar
[3] 3.Christensen, J. P. R., Some results with relation to the control measure problem, in Vector space measures and applications II. Lecture Notes in Mathematics No 645 (Springer-Verlag, 1978). Google Scholar
[4] 4.Christensen, J. P. R. and Herer, W., On the existence of pathological submeasures and the construction of exotic topological groups, Math. Ann. 213 (1975), 203–210. Google Scholar
[5] 5.Hunt, R. A., On L (p, q) spaces, Enseignement Math. 12 (1966), 249–274. Google Scholar
[6] 6.Johnson, W. B., Maurey, B., Schechtman, G. and Tzafriri, L., Symmetric structures in Banach spaces, Mem. Amer. Math. Soc. No. 217 (Providence, 1979). Google Scholar
[7] 7.Kalton, N. J., Topologies on Riesz groups with applications to measure theory, Proc. London Math. Soc. (3) 28 (1974), 253–273. Google Scholar | DOI
[8] 8.Kalton, N. J., Linear operators on L for 0 < p < l, Trans. Amer. Math. Soc. 259 (1980), 319–355. Google Scholar
[9] 9.Kalton, N. J., Isomorphisms between spaces of vector-valued continuous functions, Proc. Edinburgh Math. Soc. 26 (1983), 29–48. Google Scholar | DOI
[10] 10.Kalton, N. J., Representations of operators between function spaces, Indiana Univ. Math. J. to appear. Google Scholar
[11] 11.Kalton, N. J. and Roberts, J. W., Uniformly exhaustive submeasures and nearly additive set functions, Trans. Amer. Math. Soc. 278 (1983), 803–816. Google Scholar | DOI
[12] 12.Krivine, J. L., Théoremes de factorisation dans les espaces reticules, Seminaire Maurey-Schwartz 1973–4, Exposés 22–23, Ecole Polytechnique (Paris). Google Scholar
[13] 13.Lindenstrauss, J. and Tzafriri, L., Classical Banach spaces II, Function spaces (Springer- Verlag, 1979). Google Scholar
[14] 14.Maurey, B., Type et cotype dans les espaces munis de structure locales incontitiononelles, Seminaire Maurey-Schwartz 1973–4, Exposés 24–25Ecole Polytechnique (Paris). Google Scholar
[15] 15.Maurey, B.Théorèmes de factorisation pour les operateurs linéaires à valeurs dans un espace L (Asterisque No 11, 1974). Google Scholar
[16] 16.Maurey, B. and Pisier, G., Series de variables aleatoires vectorielles independantes et propriétés geometriques des espaces de Banach, Studia Math. 58 (1976), 45–90. Google Scholar
[17] 17.Popa, N., Uniqueness of symmetric structures in L (μ) for 0 < p < 1, Rev. Roumaine. Math. Pures. Appl. to appear. Google Scholar
[18] 18.Rolewicz, S., Metric linear spaces (PWN, Warsaw 1972). Google Scholar
[19] 19.Schaefer, H. H., Banach lattices and positive operators, (Springer-Verlag, 1974). Google Scholar | DOI
[20] 20.Talagrand, M., A simple example of a pathological submeasure, Math. Ann. 252 (1980), 97–102. Google Scholar
[21] 21.Thomas, G. E. F., On Radon maps with values in arbitrary topological vector spaces and their integral extension (unpublished paper, 1972). Google Scholar
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