A generalized Liouville theorem via division
Abstract
We study the equation P(i∇)u=0 on Rd for a class of admissible symbols P whose zero set is the unit sphere Sd-1 and which vanish there to some finite order. Working in the framework of Lizorkin distributions, and hence without any boundedness or decay hypothesis on u, we give a complete classification of the solutions: u solves P(i∇)u=0 if and only if u is a multi-layer distribution on Sd-1 of order at most N. Alternatively, u solves P(i∇)u=0 if and only if (1+Δ)N+1u=0 if P satisfies a flatness condition. The proof recasts the equation as a division problem and combines the order of vanishing of P with the structure theorem for distributions. This unifies and extends known Helmholtz-type rigidity results, which correspond to a simple zero on the sphere, to symbols with zeros of arbitrary finite order.
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