On Landis' conjecture in the plane
Abstract
In this paper we prove a quantitative form of Landis' conjecture in the plane. Precisely, let W(z) be a measurable real vector-valued function and V(z) 0 be a real measurable scalar function, satisfying \|W\|L∞( R2) 1 and \|V\|L∞( R2) 1. Let u be a real solution of u-∇(Wu)-Vu=0 in R2. Assume that u(0)=1 and |u(z)|(C0|z|). Then u satisfies |z0|=R∈f\,|z-z0|<1|u(z)| (-CR R), where C depends on C0. In addition to the case of the whole plane, we also establish a quantitative form of Landis' conjecture defined in an exterior domain.
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