Fractal transference principle for continued fractions of Laurent series

Abstract

We establish a fractal transference principle for continued fraction expansions over the field of Laurent series. Let S be an infinite subset of the set of all polynomials over a finite field of q elements of positive degree with growth density exponent α 1, and let U ⊂ S be a subset of positive relative upper density. We prove that there exists a subset ES,U of the set of points whose continued fraction digits are pairwise distinct and belong to S such that \[ H ES,U=12α.\] Moreover, the set of digits appearing in the continued fraction expansions of points in ES,U recovers the relative upper density of U in S. We also show that the same construction preserves the relative upper density of the corresponding degree sets in N. As a consequence, combinatorial statements for subsets of N of positive upper density can be transferred to degree sets arising from continued fraction expansions of Laurent series on sets of optimal Hausdorff dimension.