On the inner radius of the nonvanishing set for eigenfunctions of complex elliptic operators
Abstract
Let ⊂Rd be any open set. We consider solutions of Hλ=λ λ, λ∈C, where H is an mth order complex constant-coefficient elliptic partial differential operator. We prove that either the eigenfunctions satisfy a lower bound on the inner radius of the complement of the zero set of λ in of order |λ|-1/m, or 100% of the L2 mass of λ concentrates in a boundary layer of width |λ|-1/m, as |λ|+∞.
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