Solutions to the Thin Obstacle Problem with non-2D frequency

Abstract

For all odd positive integers m, we construct μ-homogeneous solutions to the thin obstacle problem in R3, with μ∈(m,m+1). For m large, μ-m converges to 1, so μ≠ m+ 1 2. The restriction to odd values of m is necessary: we show that, for all n 2, there are no μ-homogeneous solutions to the thin obstacle problem in Rn with μ ∈ k 0(2k,2k+1). These examples also apply to 2-valued C1,1/2 stationary harmonic functions or Z/2Z-eigenfunctions of the laplacian on the sphere.

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