Uniqueness of generalized p-area minimizers and integrability of a horizontal normal in the Heisenberg group

Abstract

We study the uniqueness of generalized p-minimal surfaces in the Heisenberg group. The generalized p-area of a graph defined by u reads ∫ |∇ u+F| + Hu. If u and v are two minimizers for the generalized p-area satisfying the same Dirichlet boundary condition, then we can only get NF(u) = NF(v) (on the nonsingular set) where NF(w) := ∇ w+F|∇ w+F|. To conclude u = v (or ∇ u = ∇ v), it is not straightforward as in the Riemannian case, but requires some special argument in general. In this paper, for a generalized area functional including p-area, we prove that NF(u) = NF(v) implies ∇ u = ∇ v in dimension ≥ 3 under some rank condition on derivatives of F or the nonintegrability condition of contact form associated to u or v. Note that in dimension 2 (n=1), the above statement is no longer true. Inspired by an equation for the horizontal normal NF(u), we study the integrability for a unit vector to be the horizontal normal of a graph. We find a Codazzi-like equation together with this equation to form an integrability condition.