Existence of radial solutions to biharmonic k-Hessian equations

Abstract

This work presents the construction of the existence theory of radial solutions to the elliptic equation equation 2 u = (-1)k Sk[u] + λ f(x), x ∈ B1(0) ⊂ RN, equation provided either with Dirichlet boundary conditions eqnarray u = ∂n u = 0, x ∈ ∂ B1(0), eqnarray or Navier boundary conditions equation u = u = 0, x ∈ ∂ B1(0), equation where the k-Hessian Sk[u] is the kth elementary symmetric polynomial of eigenvalues of the Hessian matrix and the datum f ∈ L1(B1(0)) while λ ∈ R. We prove the existence of a Carath\'eodory solution to these boundary value problems that is unique in a certain neighborhood of the origin provided |λ| is small enough. Moreover, we prove that the solvability set of λ is finite, giving an explicity bound of the extreme value.