A representation formula for the distributional normal derivative
Abstract
We prove an integral representation formula for the distributional normal derivative of solutions of \ aligned - u + V u &= μ && in ,\\ u &= 0 && on ∂, aligned . where V ∈ Lloc1() is a nonnegative function and μ is a finite Borel measure on . As an application, we show that the Hopf lemma holds almost everywhere on ∂ when V is a nonnegative Hopf potential.
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