JEDNOSTKA NAUKOWA KATEGORII A+

Artykuły w formacie PDF dostępne są dla subskrybentów, którzy zapłacili za dostęp online, po podpisaniu licencji Licencja użytkownika instytucjonalnego. Czasopisma do 2009 są ogólnodostępne (bezpłatnie).

Destruction of CPE-normality along deterministic sequences

Tom 266 / 2024

Adam Abrams, Tomasz Downarowicz Fundamenta Mathematicae 266 (2024), 167-192 MSC: Primary 11A55; Secondary 11K16, 37B10 DOI: 10.4064/fm231223-22-3 Opublikowany online: 1 July 2024

Streszczenie

Let $\mu $ be a shift-invariant measure on $\Lambda ^{\mathbb N}$, where $\Lambda $ is a finite or countable alphabet. We say that an infinite set $S=\{s_1,s_2,\dots \}\subset \mathbb N $ (where $s_1 \lt s_2 \lt \cdots $) preserves [destroys] $\mu $-normality if, for any $x=(x_1,x_2,\dots )\in \Lambda ^{\mathbb N}$ generic for $\mu $, the sequence $x|_S=(x_{s_1},x_{s_2},\dots )$ is [is not] generic for $\mu $. It is known from the work of Kamae and Weiss that if $\mu $ is i.i.d. then any deterministic set of positive lower density preserves $\mu $-normality. We show that deterministic sets, except ones with a very primitive structure that we call “superficial”, destroy $\mu $-normality for any non-i.i.d. measure $\mu $ with completely positive entropy (CPE). This generalizes Heersink and Vandehey’s result for arithmetic progressions and the Gauss measure (associated to the continued fraction transformation). We give several examples showing that outside the class of measures with CPE, $\mu $-normality preservation can coexist with nearly any combination of three parameters: determinism of $S$ (or its lack), entropy of $\mu $ (zero or positive), and disjointness (or its lack) between $\mu $ and the measures quasi-generated by $ 1_S\in \{0,1\}^{\mathbb N}$.

Autorzy

  • Adam AbramsFaculty of Pure and Applied Mathematics
    Wrocław University of Science and Technology
    Wrocław, Poland
    e-mail
  • Tomasz DownarowiczFaculty of Pure and Applied Mathematics
    Wrocław University of Science and Technology
    Wrocław, Poland
    e-mail

Przeszukaj wydawnictwa IMPAN

Zbyt krótkie zapytanie. Wpisz co najmniej 4 znaki.

Przepisz kod z obrazka

Odśwież obrazek

Odśwież obrazek