An optimal fractional Hardy inequality on the discrete half-line

Abstract

In the context of Hardy inequalities for the fractional Laplacian (-N)σ on the discrete half-line N, we provide an optimal Hardy-weight Wopσ for exponents σ∈(0,1]. As a consequence, we provide an estimate of the sharp constant in the fractional Hardy inequality with the classical Hardy-weight n-2σ on N. It turns out that for σ =1 the Hardy-weight Wop1 is pointwise larger than the optimal Hardy-weight obtained by Keller--Pinchover--Pogorzelski near infinity. As an application of our main result, we obtain unique continuation results at infinity for the solutions of some fractional Schr\"odinger equation.