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Paper detail

Quantitative uniqueness for elliptic equations at the boundary of $C^{1, Dini}$ domains

Based on a variant of the frequency function approach of Almgren, we establish an optimal upper bound on the vanishing order of solutions to variable coefficient Schrödinger equations at a portion of the boundary of a $C^{1,Dini}$ domain. Such bound provides a quantitative form of strong unique continuation at the boundary. It can be thought of as a boundary analogue of an interior result recently obtained by Bakri and Zhu for the standard Laplacian.

preprint2016arXivOpen access
Agnid BanerjeeNicola Garofalo
math.AP
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Agnid BanerjeeNicola Garofalo

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