Bounds for partial derivatives: necessity of UMD and sharp constants
Abstract
We prove the necessity of the UMD condition, with a quantitative estimate of the UMD constant, for any inequality in a family of Lp bounds between different partial derivatives ∂β u of u∈ C∞c(Rn,X). In particular, we show that the estimate \|uxy\|p≤ K(\|uxx\|p+\|uyy\|p) characterizes the UMD property, and the best constant K is equal to one half of the UMD constant. This precise value of K seems to be new even for scalar-valued functions.
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