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Some nicely placed Hardy spaces

  • C. FINET (a1) and D. J. H. GARLING (a2)

Abstract

Let L0=L0(Ω, [sum ], μ) denote the vector space of (equivalence classes of) measurable functions on a measure space (Ω, [sum ], μ), taking values in a finite-dimensional Hilbert space H. We give L0 the topology τ0 of local convergence in measure[ratio ]τ0 is a complete vector space topology, with base of neighbourhoods

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where

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Some nicely placed Hardy spaces

  • C. FINET (a1) and D. J. H. GARLING (a2)

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