Freiman's 3k-4 Theorem for Function Fields
Abstract
Freiman's 3k-4 Theorem states that if a subset A of k integers has a Minkowski sum A+A of size at most 3k-4, then it must be contained in a short arithmetic progression. We prove a function field analogue that is also a generalisation: it states that if K is a perfect field and if S⊃ K is a vector space of dimension k inside an extension F/K in which~K is algebraically closed, and if the K-vector space generated by all products of pairs of elements of S has dimension at most 3k-4, then K(S) is a function field of small genus, and S is of small codimension inside a Riemann-Roch space of K(S).
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