Elliptic boundary value problems with fractional regularity data : the first order approach

In this monograph the authors study the well-posedness of boundary value problems of Dirichlet and Neumann type for elliptic systems on the upper half-space with coefficients independent of the transversal variable and with boundary data in fractional Hardy-Sobolev and Besov spaces. The authors use the so-called ``first order approach'' which uses minimal assumptions on the coefficients and thus allows for complex coefficients and for systems of equations. This self-contained exposition of the first order approach offers new results with detailed proofs in a clear and accessible way and will become a valuable reference for graduate students and researchers working in partial differential equations and harmonic analysis.

Introduction Function space preliminaries Operator theoretic preliminaries Adapted Besov-Hardy-Sobolev spaces Spaces adapted to perturbed Dirac operators Classification of solutions to Cauchy-Riemann systems and elliptic equations Applications to boundary value problems Bibliography Index.