Guo, Chang-YuXiang, Chang-Lin2019-11-052019-11-052019-11-05202010.1112/jlms.12289https://infoscience.epfl.ch/handle/20.500.14299/162684WOS:000491792900001In this paper, we obtain interior Holder continuity for solutions of the fourth-order elliptic system Delta(2)u = Delta(V center dot del u) + div(w del u) + W center dot del u formulated by Lamm and Riviere [Comm. Partial Differential Equations 33 (2008) 245-262]. Boundary continuity is also obtained under a standard Dirichlet or Navier boundary condition. We also use conservation law to establish a weak compactness result which generalizes a result of Riviere for the second-order problem.MathematicsMathematicsbiharmonic mapsboundary-regularitypolyharmonic mapsweak compactnessharmonic mapstext::journal::journal article::research article