Convex duality for principal frequencies
Abstract
We consider the sharp Sobolev-Poincar\'e constant for the embedding of W1,20() into Lq(). We show that such a constant exhibits an unexpected dual variational formulation, in the range 1<q<2. Namely, this can be written as a convex minimization problem, under a divergence--type constraint. This is particularly useful in order to prove lower bounds. The result generalizes what happens for the torsional rigidity (corresponding to q=1) and extends up to the case of the first eigenvalue of the Dirichlet-Laplacian (i.e. to q=2).
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