Shift operators and two applications to

Infinite Dimensional Analysis, Quantum Probability and Related Topics, 2001

Monomial mappings, x ↦ xn, are topologically transitive and ergodic with respect to Haar measure on the unit circle in the complex plane. In this paper we obtain an analogous result for monomial dynamical systems over p-adic numbers. The process is, however, not straightforward. The result will depend on the natural number n. Moreover, in the p-adic case we will not have ergodicity on the unit circle, but on the circles around the point 1.

Doklady Mathematics, 2012

Journal of Functional Analysis, 2014

We apply the Garnett-Jones distance to the analysis of Schauder bases of translates. A special role is played by periodization functions p ψ with ln p ψ in the closure of L ∞ in BMO(T). In particular, for Schauder bases with such periodization functions we study the corresponding coefficient space. We also use the Garnett-Jones distance approach to show the stability of bases of translates with respect to convolution powers. The case of democratic conditional Schauder bases of translates is emphasized, as well.

P-Adic Numbers, Ultrametric Analysis, and Applications, 2012

This paper is devoted to (discrete) p-adic dynamical systems, an important domain of algebraic and arithmetic dynamics [31]-[41], [5]- . In this note we study properties of measurepreserving dynamical systems in the case p = 3. This case differs crucially from the case p = 2. The latter was studied in the very detail in . We state results on all compatible functions which preserve measure on the space of 3-adic integers, using previous work of A. Khrennikov and author of present paper, see . To illustrate one of the obtained theorems we describe conditions for the 3-adic generalized polynomial to be measure-preserving on Z 3 . The generalized polynomials with integral coefficients were studied in and represent an important class of T-functions. In turn, it is well known that T-functions are well-used to create secure and efficient stream ciphers, pseudorandom number generators.

2014

Acta Arithmetica, 2004

Proceedings of the American Mathematical Society, 2002

Let µ be a finite, positive Borel measure with support in {z : |z| ≤ 1} such that P 2 (µ)-the closure of the polynomials in L 2 (µ)-is irreducible and each point in D := {z : |z| < 1} is a bounded point evaluation for P 2 (µ). We show that if µ(∂D) > 0 and there is a nontrivial subarc γ of ∂D such that γ log(dµ dm)dm > −∞, then dim(M zM) = 1 for each nontrivial closed invariant subspace M for the shift Mz on P 2 (µ).

We give lower bounds for the size of linearization discs for power series over $\mathbb{C}_p$. For quadratic maps, and certain power series containing a `sufficiently large&#39; quadratic term, we find the exact linearization disc. For finite extensions of $\mathbb{Q}_p$, we give a sufficient condition on the multiplier under which the corresponding linearization disc is maximal (i.e. its radius coincides with that of the maximal disc in $\mathbb{C}_p$ on which $f$ is one-to-one). In particular, in unramified extensions of $\mathbb{Q}_p$, the linearization disc is maximal if the multiplier map has a maximal cycle on the unit sphere. Estimates of linearization discs in the remaining types of non-Archimedean fields of dimension one were obtained in \cite{Lindahl:2004,Lindahl:2009,Lindahl:2009eq}. Moreover, it is shown that, for any complete non-Archimedean field, transitivity is preserved under analytic conjugation. Using results by Oxtoby \cite{Oxtoby:1952}, we prove that transitivit...

Contemporary Mathematics, 2010

Proceedings of the London Mathematical Society, 2003