On Ruzsa's discrete Brunn-Minkowski conjecture
Abstract
We prove a conjecture by Ruzsa from 2006 on a discrete version of the Brunn-Minkowski inequality, stating that for any A,B⊂Zk and ε>0 with B not contained in nk,ε parallel hyperplanes we have |A+B|1/k≥ |A|1/k+(1-ε)|B|1/k.
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