Hilbert points in Hilbert space-valued Lp spaces
Abstract
Let H be a Hilbert space and (,F,μ) a probability space. A Hilbert point in Lp(; H) is a nontrivial function such that \|\|p ≤ \|+f\|p whenever f, = 0. We demonstrate that is a Hilbert point in Lp(; H) for some p≠2 if and only if \|(ω)\|H assumes only the two values 0 and C>0. We also obtain a geometric description of when a sum of independent Rademacher variables is a Hilbert point.
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