Measure doubling of small sets in SO(3,R)
Abstract
Let SO(3,R) be the 3D-rotation group equipped with the real-manifold topology and the normalized Haar measure μ. Resolving a problem by Breuillard and Green, we show that if A ⊂eq SO(3,R) is an open subset with sufficiently small measure, then μ(A2) > 3.99 μ(A). We also show a more general result for the product of two sets, which can be seen as a Brunn-Minkowski-type inequality for sets with small measure in SO(3,R).
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