Failure of Lang's Flat Chain Conjecture and non-regularity of the prescribed Jacobian equation

Abstract

We show that Lang's Flat Chain Conjecture (that is, without requiring finite mass of the underlying currents) fails for metric k-currents in Rd whenever d≥ 2 and k∈\1, …, d\. In all other cases, it holds. The original conjecture due to Ambrosio and Kirchheim remains open. We first connect Lang's conjecture to a regularity statement concerning the prescribed Jacobian equation near L∞. We then show that the equation does not have the required regularity. For a Lipschitz vector field π, its derivative Dπ exists a.e. and is identified with a matrix. Our non-regularity results for the prescribed Jacobian equation quantify how "small" the set equation* conv(\detD π: Lip(π)≤ L\)⊂ L∞ equation* is for every L>0. The symbol "conv" stands for the convex hull. The "smallness" is quantified in topological terms and is used to show that Lang's Flat Chain Conjecture fails.