Optimal regularity for two-dimensional Pfaffian systems and the fundamental theorem of surface theory

Abstract

We prove that a Pfaffian system with coefficients in the critical space L2loc on a simply connected open subset of R2 has a non-trivial solution in W1,2loc if the coefficients are antisymmetric and satisfy a compatibility condition. As an application of this result, we show that the fundamental theorem of surface theory holds for prescribed first and second fundamental forms of optimal regularity in the classes W1,2loc and L2loc, respectively, that satisfy a compatibility condition equivalent to the Gauss-Codazzi-Mainardi equations. Finally, we give a weak compactness theorem for surface immersions in the class W2,2loc.