Nestor Guillen
Published 2009-01-05Version 1
We prove under general assumptions that solutions of the thin obstacle or Signorini problem in any space dimension achieve the optimal regularity $C^{1,1/2}$. This improves the known optimal regularity results by allowing the thin obstacle to be defined in an arbitrary $C^{1,\beta}$ hypersurface, $\beta>1/2$, additionally, our proof covers any linear elliptic operator in divergence form with smooth coefficients. The main ingredients of the proof are a version of Almgren's monotonicity formula and the optimal regularity of global solutions.
The $C^{1,α}$ boundary Harnack in slit domain and its application to the Signorini problem
Existence, uniqueness and optimal regularity results for very weak solutions to nonlinear elliptic systems
Higher Regularity for the Signorini Problem for the Homogeneous, Isotropic Lamé System
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