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arxiv: 2306.17562 · v1 · pith:UGONZCPYnew · submitted 2023-06-30 · 🧮 math.AP

Characterization of solutions of a generalized Helmholtz problem

classification 🧮 math.AP
keywords deltafracsigmasolutionsarticlebernsteincharacterizationclassify
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In this article, we classify all distributional solutions of $f(-\Delta)u=f(1)u$ where $f$ is a non-constant Bernstein function. Specifically, we show that the Fourier transform of $u$ is a single-layer distribution on the unit sphere. Examples of such operators include $(-\Delta)^\sigma$ (for $\sigma \in (0,1]$), $\log(1-\Delta)$ and $(-\Delta)^\frac{1}{2}\text{tanh}((-\Delta)^\frac{1}{2})$.

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  1. A generalized Liouville theorem via division

    math.AP 2026-07 unverdicted novelty 7.0

    Solutions to P(i∇)u=0 are exactly the multi-layer distributions of order ≤N on S^{d-1}, or satisfy a higher-order Laplace equation under flatness.