A geometric characterization of non-atomic measure spaces

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Bohnenblust, H., and S. Karlin: Geometric properties of the unit sphere of Banach algebras. Ann. of Math.62, 217–229 (1955).
Google Scholar
Dixmier, J.: Sur certains espaces considérés par M. H. Stone. Summa Brasil. Math.2, 151–182 (1951).
Google Scholar
Dye, H.: Unitary structure in rings of operators. Duke Math. J.20, 55–69 (1953).
Google Scholar
Kadison, R., and I. Singer: Extensions of pure states. Amer. J. Math.81, 383–400 (1959).
Google Scholar
Klee, V.: Some new results on smoothness and rotundity in normed linear spaces. Math. Ann.139, 51–63 (1959).
Google Scholar
Poulsen, E.: Compact convex sets with dense extreme points. Amer. Math. Monthly66, 577–578 (1959).
Google Scholar
Segal, I.: Equivalences of measure spaces. Amer. J. Math.73, 275–313 (1951).
Google Scholar

Division of Mathematical Sciences, Purdue University, 47907, Lafayette, Indiana, USA
R. B. Holmes

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R. B. Holmes
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Holmes, R.B. A geometric characterization of non-atomic measure spaces. Math. Ann. 182, 55–59 (1969). https://doi.org/10.1007/BF01350163

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