Two properties of optimisers for the reverse isoperimetric problem
Abstract: The reverse isoperimetric problem asks for existence and properties of bounded convex sets in a Riemannian manifold which maximise the perimeter under all those sets of fixed volume which roll freely in a ball of some given radius. If the boundary of the set is of class $C{2}$, this amounts to a positive lower bound on the principal curvatures and in this class we prove that there are no $C{2}$-maximisers of perimeter with prescribed volume. In addition, we prove that a given possibly non-$C{2}$ maximiser has its smallest principal curvature constant in regions where it is of class $C{2}$. We prove this result in the Euclidean, spherical and hyperbolic space.
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