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Let Ω⊂Rd be a C1 domain or, more generally, a Lipschitz domain with small Lipschitz constant and A(x) be a d×d
uniformly elliptic, symmetric matrix with Lipschitz coefficients. Assume u is harmonic in Ω, or with greater generality u solves div(A(x)∇u)=0 in Ω, and u vanishes on Σ=∂Ω∩B for some ball B. We study the dimension of the singular set of u in Σ, in particular we show that there is a countable family of open balls (Bi)i
such that u|Bi∩Ω does not change sign and K∖⋃iBi has Minkowski dimension smaller than d−1−ϵ for any compact K⊂Σ. We also find upper bounds for the (d−1)-dimensional Hausdorff measure of the zero set of u in balls intersecting Σ in terms of the frequency. As a consequence, we prove a new unique continuation principle at the boundary for this class of functi... |
