Compactness results for triholomorphic maps

Abstract

We consider triholomorphic maps from an almost hyper-Hermitian manifold M4m into a hyperK\"ahler manifold N4n. This means that u ∈ W1,2 satisfies a quaternionic del-bar equation. We work under the assumption that u is locally strongly approximable in W1,2 by smooth maps: then such maps are almost stationary harmonic (when M is hyperK\"ahler as well, then stationary harmonic). We show that in this more general situation the classical ε-regularity result still holds. We then address compactness issues for a weakly converging sequence u u∞ of strongly approximable triholomorphic maps u:M N with uniformly bounded Dirichlet energies. The blow up analysis leads, as in the usual stationary setting, to the existence of a rectifiable blow-up set of codimension 2, away from which the sequence converges strongly. The defect measure (x) H4m-2 encodes the loss of energy in the limit; we prove that for a.e. point on the value of is given by the sum of energies of a (finite) number of smooth non-constant holomorphic bubbles (here the holomorphicity is understood w.r.t. a complex structure on N that depends on the chosen point on ). In the case that M is hyperK\"ahler this result was established by C. Y. Wang (2003) with a different proof; we rely on Lorentz space estimates. By means of a calibration and a homological argument we further prove that for each portion of Singu∞ contained in a Lipschitz graph we find a unique alm. compl. st. on M that makes the portion pseudoholomorphic and smooth, with constant; moreover the bubbles originating at points of such a smooth piece are holomorphic for a common complex structure.