5n Minkowski symmetrizations suffice to arrive at an approximate Euclidean ball
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🧮 math.FA
math.MG
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approximateballeuclideanminkowskisymmetrizationsbodyapproachingarrive
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This paper proves that for every convex body in R^n there exist 5n-4 Minkowski symmetrizations, which transform the body into an approximate Euclidean ball. This result complements the sharp c n log n upper estimate by J. Bourgain, J. Lindenstrauss and V.D. Milman, of the number of random Minkowski symmetrizations sufficient for approaching an approximate Euclidean ball.
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