Derivatives of L^p eigenfunctions of Schrodinger operators
classification
🧮 math.SP
math.CA
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derivativeseigenfunctionsoperatorsschrodingerassumingderivativeeigenfunctionestimate
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Assuming the negative part of the potential is uniformly locally $L^1$, we prove a pointwise $L^p$ estimate on derivatives of eigenfunctions of one-dimensional Schrodinger operators. In particular, if an eigenfunction is in $L^p$, then so is its derivative, for $1\le p\le \infty$.
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