Your search keyword '"DAI, XIN-RONG"' showing total 3 results

1. Connectedness and local cut points of generalized Sierpinski carpets

Author

Dai, Xin-Rong, Luo, Jun, Ruan, Huo-Jun, Wang, Yang, and Xiao, Jian-Ci

Subjects

Mathematics - Metric Geometry, General Topology (math.GN), FOS: Mathematics, Metric Geometry (math.MG), 28A80 (primary), 54A05 (secondary), Mathematics - General Topology

Abstract

We investigate a homeomorphism problem on a class of self-similar sets called generalized Sierpinski carpets (or shortly GSCs). It follows from two well-known results by Hata and Whyburn that a connected GSC is homeomorphic to the standard Sierpinski carpet if and only if it has no local cut points. On the one hand, we show that to determine whether a given GSC is connected, it suffices to iterate the initial pattern twice. On the other hand, we obtain two criteria: (1) for a connected GSC to have cut points, (2) for a connected GSC with no cut points to have local cut points. With these two criteria, we characterize all GSCs that are homeomorphic to the standard Sierpinski carpet. Our results on cut points and local cut points hold for Baranski carpets, too. Moreover, we extend the connectedness result to Baranski sponges. Thus, we also characterize when a Baranski carpet is homeomorphic to the standard GSC., 41 pages, 14 figures

Published

2021

2. On Spectral N-Bernoulli Mmeasure

Author

Dai, Xin-Rong, He, Xing-Gang, and Lau, Ka-Sing

Subjects

Mathematics - Functional Analysis, FOS: Mathematics, Functional Analysis (math.FA)

Abstract

For $01$ an integer, let $\mu$ be the self-similar measure defined by $\mu(\cdot)=\sum_{i=0}^{N-1}\frac 1N\mu(\rho^{-1}(\cdot)-i)$. We prove that $L^2(\mu)$ has an exponential orthonormal basis if and only if $\rho=\frac 1q$ for some $q>0$ and $N$ divides $q$. The special case is the Cantor measure with $\rho =\frac 1{2k}$ and $N=2$ \cite {JP}, which was proved recently to be the only spectral measure among the Bernoulli convolutions with $0

Published

2014

3. The $abc$-problem for Gabor systems

Author

Dai, Xin-Rong and Sun, Qiyu

Subjects

Mathematics - Functional Analysis, FOS: Computer and information sciences, Computer Science - Information Theory, Information Theory (cs.IT), FOS: Mathematics, Dynamical Systems (math.DS), Mathematics - Dynamical Systems, Functional Analysis (math.FA)

Abstract

A Gabor system generated by a window function $\phi$ and a rectangular lattice $a \Z\times \Z/b$ is given by $${\mathcal G}(\phi, a \Z\times \Z/b):=\{e^{-2\pi i n t/b} \phi(t- m a):\ (m, n)\in \Z\times \Z\}.$$ One of fundamental problems in Gabor analysis is to identify window functions $\phi$ and time-frequency shift lattices $a \Z\times \Z/b$ such that the corresponding Gabor system ${\mathcal G}(\phi, a \Z\times \Z/b)$ is a Gabor frame for $L^2(\R)$, the space of all square-integrable functions on the real line $\R$. In this paper, we provide a full classification of triples $(a,b,c)$ for which the Gabor system ${\mathcal G}(\chi_I, a \Z\times \Z/b)$ generated by the ideal window function $\chi_I$ on an interval $I$ of length $c$ is a Gabor frame for $L^2(\R)$. For the classification of such triples $(a, b, c)$ (i.e., the $abc$-problem for Gabor systems), we introduce maximal invariant sets of some piecewise linear transformations and establish the equivalence between Gabor frame property and triviality of maximal invariant sets. We then study dynamic system associated with the piecewise linear transformations and explore various properties of their maximal invariant sets. By performing holes-removal surgery for maximal invariant sets to shrink and augmentation operation for a line with marks to expand, we finally parameterize those triples $(a, b, c)$ for which maximal invariant sets are trivial. The novel techniques involving non-ergodicity of dynamical systems associated with some novel non-contractive and non-measure-preserving transformations lead to our arduous answer to the $abc$-problem for Gabor systems.

Published

2013