Regularity for elliptic systems of differential forms and applications

Abstract

We prove existence and up to the boundary regularity estimates in Lp and H\"older spaces for weak solutions of the linear system δ ( A dω ) + BTdδ ( Bω ) = λ Bω + f in , with either ω and δ ( Bω ) or Bω and ( A dω ) prescribed on ∂. The proofs are in the spirit of `Campanato method' and thus avoid potential theory and do not require a verification of Agmon-Douglis-Nirenberg or Lopatinskii-Shapiro type conditions. Applications to a number of related problems, such as general versions of the time-harmonic Maxwell system, stationary Stokes problem and the `div-curl' systems, are included.