A counterexample to symmetry of Lp norms of eigenfunctions
Abstract
We answer a question of Jakobson and Nadirashvili on the asymptotic behavior of the Lp norms of positive and negative parts of eigenfunctions of the Laplacian. More precisely, we show that there exists a sequence of eigenfunctions n on the flat d-torus for d≥ 3, with eigenvalues λn∞ as n∞, such that the ratio \|n\n>0\\|p / \|n\n<0\\|p does not tend to 1 as n∞ for 1<p≤ ∞. Our argument is elementary and computer-assisted.
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