Sharp asymptotic behavior of radial solutions of some planar semilinear elliptic problems

Abstract

We consider the equation - u= |x|α|u|p-1u for any α≥ 0, either in R2 or in the unit ball B of R2 centered at the origin with Dirichlet or Neumann boundary conditions. We give a sharp description of the asymptotic behavior as p→ +∞ of all the radial solutions to these problems. In particular, we show that there is no uniform a priori bound (in p) for nodal solutions under Neumann or Dirichlet boundary conditions. This contrasts with the recently shown fact that positive solutions have uniform a priori bounds for α=0 and Dirichlet boundary conditions.