Sharp fractional Hardy's inequality for half-spaces in the Heisenberg group
Abstract
In this work we establish the following fractional Hardy's inequality C∫Hn+|f()|px1sp+αd≤ ∫Hn∫Hn|f()-f(')|pd(-1 ')Q+sp|z'-z|αd'd,\ \ ∀ f∈ Cc∞(Hn+) for the half-space Hn+=\=(x,y,t)=(x1,…,xn,y1,…,yn)∈Hn:x1>0\ in the Heisenberg group Hn without any restriction on parameters, and compute the corresponding sharp constant. In a previous joint work, we established a variant of Hardy's inequality for the same half-space, but with certain parameter restrictions. However, all integrals in that work were considered over half-spaces, and here the seminorm is taken over the entire Hn. Although this inequality holds for all values of the quantity sp+α, we are only able to compute the corresponding sharp constant when sp+α>1.
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