Mean Convergence of Vector--valued Walsh Series
Abstract
Given any Banach space X, let L2X denote the Banach space of all measurable functions f:[0,1] X for which ||f||2:=(int01 ||f(t)||2 dt)1/2 is finite. We show that X is a UMD--space (see BUR:1986) if and only if n||f-Sn(f)||2=0 for all f∈ L2X, where Sn(f):=sumi=0n-1 (f,wi)wi is the n--th partial sum associated with the Walsh system (wi).
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