Non-convex functionals penalizing simultaneous oscillations along independent directions: rigidity estimates

Abstract

We study a family of non-convex functionals \E\ on the space of measurable functionsu: 1×2 ⊂ Rn1×Rn2 R. These functionals vanish on the non-convex subset S(1×2) formed by functions of the form u(x1,x2)=u1(x1) or u(x1,x2)=u2(x2). We investigate under which conditions the converse implication "E(u) = 0 ⇒ u ∈ S(1×2)" holds. In particular, we show that the answer depends strongly on the smoothness of u. We also obtain quantitative versions of this implication by proving that (at least for some parameters) E(u) controls in a strong sense the distance of u to S(1×2).