Directed immersions for complex structures

Abstract

We analyze the differential relation corresponding to integrability of almost complex structures, reformulated as a directed immersion relation by Demailly and Gaussier. Combining results of Clemente [3], we show that applying h-principle techniques yields the following statement: for an almost complex manifold with arbitrary metric (X, J, g), and for ε > 0, there exists a smooth function f : X → R and almost complex structure J' on X such that J and J' are C0-close on the graph of f with respect to the extended metric on X × R, and such that the Nijenhuis tensor of J' on the graph has pointwise sup norm less than Cε, where C is a constant depending only on J and g. This is an updated version of a previous preprint titled "Almost complex manifolds are (almost) complex".