On inequalities between norms of partial derivatives on convex domains
Abstract
We consider inequalities between Lp-norms of partial derivatives, p∈ [1,+∞], for bivariate concave functions on a convex domain that vanish on the boundary. Can the ratio between those norms be arbitrarily large? If not, what is the upper bound? We show that for p=1, the ratio is always bounded and find sharp estimates, while for p>1, the answer depends on the geometry of the domain.
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