Banach lattice-valued q-variation and convexity
Abstract
In this paper, we show that the q-variation for differential operator is not bounded in Lp(R;L∞(R)) for any 1<p<∞. As a consequence, the q-variation operator can not be used to characterize the Hardy-Littlewood property of the underlying Banach lattice. Moreover, for K\"othe function spaces X with X* norming such that X is r-convex for some large r, and X is not s-convex for any s, r<s<∞, we obtain lower bounds of the (Lp(R;X),Lp(R;X)-bounds of the q-variation operator, which tends to ∞, as r tends to ∞.
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