On the Dirichlet Problem for Fully Nonlinear Elliptic Hessian Systems

Abstract

We consider the problem of existence and uniqueness of strong solutions u: ⊂ Rn RN in (H2 H10)()N to the problem \[1 1 \ arrayl F(·,D2u ) \,=\, f, \ \ in ,\\ 31pt u\,=\, 0, \ \ on ∂ , array . \] when f∈ L2()N, F is a Carath\'eodory map and is convex. 1 has been considered by several authors, firstly by Campanato and under Campanato's ellipticity condition. By employing a new weaker notion of ellipticity introduced in recent work of the author [K2] for the respective global problem on Rn, we prove well-posedness of 1. Our result extends existing ones under hypotheses weaker than those known previously. An essential part of our analysis in an extension of the classical Miranda-Talenti inequality to the vector case of 2nd order linear hessian systems with rank-one convex coefficients.