Nonstandard growth optimization problems with volume constraint

Abstract

In this article we study some optimal design problems related to nonstandard growth eigenvalues ruled by the g-Laplacian operator. More precisely, given ⊂ n and α,c>0 we consider the optimization problem ∈f \ λ(α,E) E⊂ , |E|=c \, where λ(α,E) is related to the first eigenvalue to -div(g( |∇ u |)∇ u|∇ u|) + g(u)u|u|+ α E g(u)u|u| in subject to Dirichlet, Neumann or Steklov boundary conditions. \\ We analyze existence of an optimal configuration, symmetry properties of them, and the asymptotic behavior as α approaches +∞.