Certain sets over function fields are polynomial families

Abstract

In 1938, Skolem conjectured that SLn(Z) is not a polynomial family for any n 2. Carter and Keller disproved Skolem's conjecture for all n 3 by proving that SLn(Z) is boundedly generated by the elementary matrices, and hence a polynomial family for any n 3. Only recently, Vaserstein refuted Skolem's conjecture completely by showing that SL2(Z) is a polynomial family. An immediate consequence of Vaserstein's theorem also implies that SLn(Z) is a polynomial family for any n 3. In this paper, we prove a function field analogue of Vaserstein's theorem: that is, if A is the ring of polynomials over a finite field of odd characteristic, then SL2(A) is a polynomial family in 52 variables. A consequence of our main result also implies that SLn(A) is a polynomial family for any n 3.