Buffon Needle Problem Over Convex Sets
Abstract
We solve a variant of the classical Buffon Needle problem. More specifically, we inspect the probability that a randomly oriented needle of length l originating in a bounded convex set X⊂R2 lies entirely within X. Using techniques from convex geometry, we prove an isoperimetric type inequality, showing that among sets X with equal perimeter, the disk maximizes this probability.
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