Radial biharmonic k-Hessian equations: The critical dimension

Abstract

This work is devoted to the study of radial solutions to the elliptic problem equation 2 u = (-1)k Sk[u] + λ f, 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)). We also study the existence of entire solutions to this partial differential equation in the case in which they are assumed to decay to zero at infinity and under analogous conditions of summability on the datum. Our results illustrate how, for k=2, the dimension N=4 plays the role of critical dimension separating two different phenomenologies below and above it.