Jarn\'ik-type theorem for self-similar sets

Abstract

Let K⊂ Rd be a compact subset equipped with a δ-Ahlfors regular measure μ. For any τ>1/d and any ``inhomogeneous'' vector θ∈ Rd, let Wd(τ,θ) denote the set of (τ,θ)-well approximable numbers, where τ(q)=q-τ. Assuming a local estimate for the μ-measure of the intersections of K with the neighborhoods of ``rational'' vectors ( p+θ)/q, we establish a sharp upper bound for the Hausdorff dimension of K Wd(τ,θ), together with some nontrivial lower bounds when τ is below a certain threshold. One of the lower bounds becomes sharp in the one-dimensional homogeneous case (d=1, θ=0) for a class of sufficiently thick self-similar sets K, and moreover K W1(τ,0) has full (δ+21+τ-1)-Hausdorff measure. These results have several applications: (1) the set of homogeneous very well approximable numbers has full Hausdorff dimension within strongly irreducible self-similar sets in Rd, extending a recent result of Chen [arXiv:2510.17096]; (2) the set of inhomogeneous very well approximable numbers has full Hausdorff dimension within sufficiently thick missing digits sets in R, affirmatively answering a question posed by Yu [arXiv:2101.05910]. Our applications build on the seminal works of Yu [arXiv:2101.05910] and B\'enard, He and Zhang [arXiv:2508.09076]. We also provide some non-trivial missing digits set K⊂[0,1]d whose intersection with Wd(τ,0) has full (δ+1+d1+τ-d)-Hausdorff measure.