Measure growth in compact semisimple Lie groups and the Kemperman Inverse Problem
Abstract
Suppose G is a compact semisimple Lie group, μ is the normalized Haar measure on G, and A, A2 ⊂eq G are measurable. We show that μ(A2)≥ \1, 2μ(A)+ημ(A)(1-2μ(A))\ with the absolute constant η>0 (independent from the choice of G) quantitatively determined. We also show a more general result for connected compact groups without a toric quotient and resolve the Kemperman Inverse Problem from 1964.
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