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Hausdorff dimension of Banach spaces
Published online by Cambridge University Press: 20 January 2009
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We show that if X is a Banach space of infinite dimension and μh is a Hausdorff measure, where h is continuous, then there exists a measurable set K ⊂ X such that 0<μh(K)< + ∞. We also characterize the normed spaces in which the unit ball can be covered by a sequence of balls whose radii rn < 1 converge to zero as n → ∞.
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- Copyright © Edinburgh Mathematical Society 1988
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