A remark on quantitative unique continuation from subsets of the boundary of positive measure
Abstract
The question of unique continuation of harmonic functions in a domain ⊂ R d with boundary ∂, satisfying Dirichlet boundary conditions and with normal derivatives vanishing on a subset ω of the boundary is a classical problem. When ω contains an open subset of the boundary it is a consequence of Carleman estimates (uniqueness for second order elliptic operators across an hypersurface). The case where ω is a set of positive (d -- 1) dimensional measure has attracted a lot of attention, see e.g. [10, 3, 15], where qualitative results have been obtained in various situations. The main open questions (about uniqueness) concern now Lipschitz domains and variable coefficients. Here, using results by Logunov and Malinnikova [13, 14], we consider the simpler case of W 2,∞ domains but prove quantitative uniqueness both for Dirichlet and Neumann boundary conditions. As an application, we deduce quantitative estimates for the Dirichlet and Neumann Laplace eigenfunctions on a W 2,∞ domain with boundary.
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