Analysis of blow-ups for the double obstacle problem in dimension two

Abstract

In this article we study a normalised double obstacle problem with polynomial obstacles p1≤ p2 under the assumption that p1(x)=p2(x) iff x=0. In dimension two we give a complete characterisation of blow-up solutions depending on the coefficients of the polynomials p1, p2. In particular, we see that there exists a new type of blow-ups, that we call double-cone solutions since the coincidence sets \u=p1\ and \u=p2\ are cones with a common vertex. We prove the uniqueness of blow-up limits, and analyse the regularity of the free boundary in dimension two. In particular we show that if the solution to the double obstacle problem has a double-cone blow-up limit at the origin, then locally the free boundary consists of four C1,γ-curves, meeting at the origin. In the end we give an example of a three-dimensional double-cone solution.