On the p-Laplacian with Robin boundary conditions and boundary trace theorems

Abstract

Let ⊂R, 2, be a C1,1 domain whose boundary ∂ is either compact or behaves suitably at infinity. For p∈(1,∞) and α>0, define \[ (,p,α):=∈fu∈ W1,p()\\ u 0 ∫ |∇ u|p d x - α∫∂ |u|pdσ∫ |u|pd x, \] where dσ is the surface measure on ∂. We show the asymptotics \[ (,p,α)=-(p-1)αpp-1 - (-1)Hmax\, α + o(α), α+∞, \] where Hmax is the maximum mean curvature of ∂. The asymptotic behavior of the associated minimizers is discussed as well. The estimate is then applied to the study of the best constant in a boundary trace theorem for expanding domains, to the norm estimate for extension operators and to related isoperimetric inequalities.