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The derivative of the fractional discrete Laplacian is an exotic Riesz potential

Published 1 Mar 2026 in math.AP | (2603.01039v1)

Abstract: Let $Δ_{N}$ be the multidimensional discrete Laplacian on $\mathbb{Z}N$ ($N\ge1$). In this note, we prove that, when $N=1$, the right hand derivative of $(-Δ_1)s$ at $0$ is an exotic discrete Riesz potential (namely, the endpoint case: the order is 0) in Stein-Wainger sense (J. Anal. Math. 2000), and when $N\ge 2$, the corresponding derivative is also an exotic discrete Riesz potential with an additional corrector. A similar conclusion for the left hand derivative case is also considered. All results obtained in this note extend the logarithmic Laplacian of Chen-Weth (Comm. PDEs. 2019) to the discrete setting.

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