On the minimization of Dirichlet eigenvalues of the Laplace operator

Abstract

We study the variational problem ∈f \λk(): \ open in\ m,\ || < ∞, \ (∂ ) 1 \, where λk() is the k'th eigenvalue of the Dirichlet Laplacian acting in L2(), (∂ ) is the (m-1)- dimensional Hausdorff measure of the boundary of , and || is the Lebesgue measure of . If m=2, and k=2,3, ·s, then there exists a convex minimiser 2,k. If m 2, and if m,k is a minimiser, then m,k*:= int(m,k) is also a minimiser, and m m,k* is connected. Upper bounds are obtained for the number of components of m,k. It is shown that if m 3, and k m+1 then m,k has at most 4 components. Furthermore m,k is connected in the following cases : (i) m 2, k=2, (ii) m=3,4,5, and k=3,4, (iii) m=4,5, and k=5, (iv) m=5 and k=6. Finally, upper bounds on the number of components are obtained for minimisers for other constraints such as the Lebesgue measure and the torsional rigidity.