Quantization for biharmonic maps from non-collapsed degenerating Einstein 4-manifolds

Abstract

For a sequence of extrinsic or intrinsic biharmonic maps uj: Mj→ N from a sequence of non-collapsed degenerating closed Einstein 4-manifolds (Mj,gj) with bounded Einstein constants, bounded diameters and bounded L2 curvature energy into a compact Riemannian manifold (N,h) with uniformly bounded biharmonic energy, we establish a compactness theory modular finitely many bubbles, which are finite energy biharmonic maps from R4, or from R4 / for some nontrivial finite group ⊂ SO(4), or from some complete, noncompact, Ricci flat, non-flat ALE 4-manifold (orbifold). To achieve this, we develop a sophisticated asymptotic analysis for solutions over degenerating neck regions.