Optimal Gagliardo-Nirenberg interpolation inequality for rearrangement invariant spaces
Abstract
We prove optimality of the Gagliardo-Nirenberg inequality \|∇ u\|X\|∇2 u\|Y1/2\|u\|Z1/2, where Y, Z are rearrangement invariant Banach function spaces and X=Y1/2Z1/2 is the Calder\'on--Lozanovskii space. By optimality, we mean that for a certain pair of spaces on the right-hand side, one cannot reduce the space on the left-hand, remaining in the class of rearrangement invariant spaces. The optimality for the Lorentz and Orlicz spaces is given as a consequence, exceeding previous results. We also discuss pointwise inequalities, their importance and counterexample prohibiting an improvement.
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