On the minimization of Dirichlet eigenvalues
Abstract
Results are obtained for two minimization problems: Ik(c)=∈f \λk(): \ open, convex in\ Rm,\ T()= c \, and Jk(c)=∈f\λk(): \ quasi-open in\ Rm, || 1, P() c \, where c>0, λk() is the k'th eigenvalue of the Dirichlet Laplacian acting in L2(), || denotes the Lebesgue measure of , P() denotes the perimeter of , and where T is in a suitable class set functions. The latter include for example the perimeter of , and the moment of inertia of with respect to its center of mass.
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