Small-scale mass estimates for Neumann eigenfunctions: piecewise smooth planar domains
Abstract
Let be a piecewise-smooth, bounded convex domain in 2 and consider L2-normalized Neumann eigenfunctions φλ with eigenvalue λ2. Our main result is a small-scale non-concentration estimate: We prove that for any x0 ∈ , (including boundary and corner points) and any δ ∈ [0,1), \| φλ \|B(x0,λ-δ) = O(λ-δ/2). The proof is a stationary vector field argument combined with a small scale induction argument.
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