On Freiman's Theorem in a function field setting

Abstract

We prove some new instances of a conjecture of Bachoc, Couvreur and Z\'emor that generalizes Freiman's 3k-4 Theorem to a multiplicative version in a function field setting. As a consequence we find that if F is a rational function field over an algebraically closed field K and S ⊂ F a finite dimensional K-vector space such that S2 = 2 S + 1, then the conjecture holds.

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