Fractal transference principles for subsets of Nd of positive density

Abstract

We establish a multidimensional fractal transference principle for digit-restricted sets associated with subsets of Nd, extending the one-dimensional framework of Nakajima--Takahasi, Adv. Math. (2025). We develop general Hausdorff-dimension tools via the singular value potential φs( a) and the multivariate Dirichlet series ζS(σ) =Σ a∈ SΠj=1d aj-σj. Let s:=∈f\s>0:Σ a∈ Sφs( a)<∞\ and S:=∈f\σ1+·s+σd:ζS(σ)<∞\. We obtain H( ES) s, where ES⊂(0,1)d denotes the set of points whose continued-fraction digit vectors lie in S and whose coordinates escape (i.e.\ an(xj)∞ for each j), and s=12S for uniformly K--balanced S. In particular, if S⊂Nd has positive upper (or upper Banach) density then H( ES)=d/2. On the combinatorial side, the transference principle ensures that translation-invariant configurations forced at positive density, including multidimensional Szemer\'edi patterns, persist inside the induced fractal digit sets.