Sumset size races for measurable sets
Abstract
Let G be a locally compact abelian group with Haar measure μ. For integers n ≥ 2 and H ≥ 2 and for any n-tuples u1,…, uH ∈ Nn, there exist measurable subsets A1,…, An of G such that the n-tuple ( μ(hA1),…, μ(hAn) ) has the same relative order as the n-tuple uh for all h = 1,…, H. For integers mi,h for i =1,…, n-1 and h = 1,…, H, there are Lebesgue measurable sets A1,…, An in R such that μ(hAi+1) - μ(hAi) = mi,h for all i and h.
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