Approximation of Spherical Bodies of Constant Width and Reduced Bodies
Abstract
We present a spherical version of the theorem of Blaschke that every body of constant width w < π2 can be approximated as well as we wish in the sense of the Hausdorff distance by a body of constant width w whose boundary consists only of pieces of circles of radius w. This is a special case of our theorem about approximation of spherical reduced bodies.
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