Unique continuation at the boundary for divergence form elliptic equations on quasiconvex domains
Abstract
Let ⊂ Rd be a quasiconvex Lipschitz domain and A(x) be a d × d uniformly elliptic, symmetric matrix with Lipschitz coefficients. Assume a nontrivial u solves -∇ · (A(x) ∇ u) = 0 in , and u vanishes on = ∂ B for some ball B. The main contribution of this paper is to demonstrate the existence of a countable collection of open balls (Bi)i such that the restriction of u to Bi maintains a consistent sign. Furthermore, for any compact subset K of , the set difference K i Bi is shown to possess a Minkowski dimension that is strictly less than d - 1 - ε. As a consequence, we prove Lin's conjecture in quasiconvex domains.
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