On sharp anisotropic Hardy inequalities
Abstract
Recently, Yanyan Li and Xukai Yan showed the following interesting Hardy inequalities with anisotropic weights: Let n≥ 2, p ≥ 1, pα > 1-n, p(α + β)> -n, then there exists C > 0 such that \||x|β|x'|α+1 ∇ u\|Lp(Rn) ≥ C\||x|β|x'|α u\|Lp(Rn), ∀\; u∈ Cc1(Rn). Here x' = (x1,…, xn-1, 0) for x = (xi) ∈ Rn. In this note, we will determine the best constant for the above estimate when p=2 or β ≥ 0. Moreover, as refinement for very special case of Li-Yan's result in Adv. Math. 2023, we provide explicit estimate for the anisotropic Lp-Caffarelli-Kohn-Nirenberg inequality.
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