On the regularity of solutions of one dimensional variational obstacle problems

Abstract

We study the regularity of solutions of one dimensional variational obstacle problems in W1,1 when the Lagrangian is locally H\"older continuous and globally elliptic. In the spirit of the work of Sychev ([Syc89, Syc91, Syc92]), a direct method is presented for investigating such regularity problems with obstacles. This consists of introducing a general subclass L of W1,1, related in a certain way to one dimensional variational obstacle problems, such that every function of L has Tonelli's partial regularity, and then to prove that, depending of the regularity of the obstacles, solutions of corresponding variational problems belong to L. As an application of this direct method, we prove that if the obstacles are C1,σ then every Sobolev solution has Tonelli's partial regularity.