Linear Relations Among Galois Conjugates Over Fq(t)

Abstract

We classify the coefficients (a1,...,an) ∈ Fq[t]n that can appear in a linear relation Σi=1n ai γi =0 among Galois conjugates γi ∈ Fq(t). We call such an n-tuple a Smyth tuple. Our main theorem gives an affirmative answer to a function field analogue of a 1986 conjecture of Smyth over Q. Smyth showed that certain local conditions on the ai are necessary and conjectured that they are sufficient. Our main result is that the analogous conditions are necessary and sufficient over Fq(t), which we show using a combinatorial characterization of Smyth tuples due to Smyth. We also formulate a generalization of Smyth's Conjecture in an arbitrary number field that is not a straightforward generalization of the conjecture over Q due to a subtlety occurring at the archimedean places.