Optimal regularity of the thin obstacle problem by an epiperimetric inequality

Abstract

The key point to prove the optimal C1,12 regularity of the thin obstacle problem is that the frequency at a point of the free boundary x0∈(u), say Nx0(0+,u), satisfies the lower bound Nx0(0+,u)32. In this paper we show an alternative method to prove this estimate, using an epiperimetric inequality for negative energies W32. It allows to say that there are not λ-homogeneous global solutions with λ∈ (1,32), and by this frequancy gap, we obtain the desired lower bound, thus a new self contained proof of the optimal regularity.