A winning approach to the intersections of twisted non-recurrent sets with fractals
Abstract
In this paper, we prove that if S⊂eqRd is hyperplane absolute winning on a closed hyperplane diffuse set L⊂eqRd, then dimH S K=dimH K for any irreducible self-conformal set K⊂eq L without assuming any separation condition on K. The result is then applied to obtain the Hausdorff dimension of intersections between irreducible self-conformal sets and twisted non-recurrent sets N(T,G) defined as N(T,G):=\x∈[0,1]d:n∞\|Tn(x)-gn(x)\|>0\, where T:[0,1]d[0,1]d belongs to a broad class of product maps, G:=\gn\n∈N is a sequence of self-maps on [0,1]d with uniform Lipschitz constant and \|·\| denotes the maximal norm in Rd. When T is the β-transformation on [0,1], it provides a positive answer to a question raised informally by Broderick, Bugeaud, Fishman, Kleinbock and Weiss (Math. Res. Lett., 2010). For the case T is a d× d diagonal matrix transformations, our results provide a partial answer asked in a paper of Li, Liao, Velani and Zorin (Adv. Math., 2023). A natural generalization to non-autonomous setting is also obtained.
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