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Convergence in shape of Steiner symmetrizations

Published 10 Jun 2012 in math.MG and math.FA | (1206.2041v1)

Abstract: There are sequences of directions such that, given any compact set K in Rn, the sequence of iterated Steiner symmetrals of K in these directions converges to a ball. However examples show that Steiner symmetrization along a sequence of directions whose differences are square summable does not generally converge. (Note that this may happen even with sequences of directions which are dense in S{n-1}.) Here we show that such sequences converge in shape. The limit need not be an ellipsoid or even a convex set. We also deal with uniformly distributed sequences of directions, and with a recent result of Klain on Steiner symmetrization along sequences chosen from a finite set of directions.

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