The relative h-principle for closed SL(3;R)2 3-forms

Abstract

This paper uses convex integration with avoidance and transversality arguments to prove the relative h-principle for closed SL(3;R)2 3-forms on oriented 6-manifolds. As corollaries, it is proven that if an oriented 6-manifold M admits any SL(3;R)2 3-form, then every degree 3 cohomology class on M can be represented by an SL(3;R)2 3-form and, moreover, that the corresponding Hitchin functional on SL(3;R)2 3-forms representing this class is necessarily unbounded above. Essential to the proof of the h-principle is a careful analysis of the rank 3 distributions induced by an SL(3;R)2 3-form and their interaction with generic pairs of hyperplanes. The proof also introduces a new property of sets in affine space, termed macilence, as a method of verifying ampleness.