Key points are not available for this paper at this time.
.We prove the existence of an open set minimizing the first Dirichlet eigenvalue of an elliptic operator with bounded, measurable coefficients, over all open sets of a given measure. Our proof is based on a free boundary approach: we characterize the eigenfunction on the optimal set as the minimizer of a penalized functional, and derive openness of the optimal set as a consequence of a Hölder estimate for the eigenfunction. We also prove that the optimal eigenfunction grows at most linearly from the free boundary, i.e., it is Lipschitz continuous at free boundary points.Keywordsshape optimizationDirichlet eigenvalueselliptic operatorirregular coefficientsMSC codes35P9935J2035B6549Q10
Snelson et al. (Wed,) studied this question.