Existence Results for the Nonlinear Hodge Minimal Surface Energy

Abstract

Given a compact Riemannian manifold (Mn,g) and a fixed cohomology class, [α*] ∈ Hk(M), we consider the existence of a minimizer α ∈ [α*] of the generalized minimal surface energy ∫M 1+|α|2 dVg. When k = 1, we prove the existence of unique minimizers for every cohomology class [α*]. Next, when k > 1, we construct examples of singular solutions for finite cohomology class [α*] ∈ Hk(Sk × Sk,g), where g is conformal to the standard metric on Sk × Sk. Additionally, we show that when k=2, these singular solutions are also solutions to the Born Infeld equation.