Hausdorff measure of sets of distributional chaotic pairs for shift maps

Abstract

Let σK: ΣK→ ΣK be a shift map. For an interval [p,q]⊂[0,1], let DσK([p,q]) denote the set of pairs for which the density spectrum of the ε-approach time set equals [p,q] when ε is small and EσK([p,q]) the set of pairs for which the density spectrum of the ε-approach time set converges to [p,q] when ε→ 0+. Then H DσK([p,q])=H EσK([p,q])=2-q. Moreover, H2-q(EσK([p,q]))=1 when q=0 and H2-q(EσK([p,q]))=+∞ when q>0. Meanwhile, H2-q(DσK([p,q]))=+∞ when q=1 and H2-q(DσK([p,q]))=0 when q<1.