Optimal sets for the quantitative isoperimetric inequality in the plane with the barycentric distance

Abstract

In a recent paper, C. Gambicchia and A. Pratelli proved a quantitative isoperimetric inequality involving the isoperimetric deficit δ(K) and the barycentric distance λ0(K) for sets K⊂ RN with given diameter D and measure. In this work we are interested in the optimal sets for this inequality in the plane, i.e. sets that minimize the ratio δ(K)/λ0(K)2. We prove existence of optimal sets (at least when D is large enough), regularity and express the optimality conditions. Moreover, we prove that the optimal sets have exactly two connected components and their boundary does not contain any arc of circle.

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