A note on Freiman models in Heisenberg groups
Abstract
Green and Ruzsa recently proved that for any s2, any small squaring set A in a (multiplicative) abelian group, i.e. |A· A|<K|A|, has a Freiman s-model: it means that there exists a group G and a Freiman s-isomorphism from A into G such that |G|<f(s,K)|A|. In an unpublished note, Green proved that such a result does not necessarily hold in non abelian groups if s64. The aim of this paper is improve Green's result by showing that it remains true under the weaker assumption s6.
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