1,180 results
Search Results
2. Addendum to our paper ‘Decreasing sequences of sigma fields: product type, standard, and substandard’
- Author
-
M. Smorodinsky and J. Feldman
- Subjects
Algebra ,Applied Mathematics ,General Mathematics ,Calculus ,Addendum ,Sigma ,Product type ,Mathematics - Published
- 2002
3. Corrigendum to the paper ‘Decidability of the isomorphism problem for stationary AF-algebras and the associated ordered simple dimension groups’
- Author
-
Ola Bratteli, Fred W. Roush, Ki Hang Kim, and Palle E. T. Jorgensen
- Subjects
Combinatorics ,Group isomorphism ,Order isomorphism ,Isomorphism extension theorem ,Applied Mathematics ,General Mathematics ,Subgraph isomorphism problem ,Induced subgraph isomorphism problem ,Isomorphism ,Graph isomorphism ,Decidability ,Mathematics - Published
- 2002
4. Correction to the paper ‘Entire functions of slow growth whose Julia set coincides with the plane’
- Author
-
Alexandre Eremenko and Walter Bergweiler
- Subjects
TheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGES ,Plane (geometry) ,Applied Mathematics ,General Mathematics ,Entire function ,ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION ,Geometry ,Julia set ,Slow growth ,Mathematics - Abstract
In our paper [1], in the proof of Proposition 1, we implicitly assume that the polynomial P is monic, although later we apply this proposition to polynomials which are not monic. The following corrections should be made in the proof of Proposition 1.
- Published
- 2001
5. A note on a paper of Bowcock and Yu
- Author
-
I. P. Stavroulakis
- Subjects
Differential equation ,General Mathematics ,Ordinary differential equation ,Mathematical analysis ,ComputingMethodologies_DOCUMENTANDTEXTPROCESSING ,Applied mathematics ,Counterexample ,Mathematics - Abstract
Consider the first order differential equation (1) , where pi, and τi, for i = 1,…,n, are positive constants. To find necessary and sufficient conditions, in terms of the coefficients and the delays only, under which all solutions of (1) oscillate, is a problem of great importence. In a recent paper, Bowcock and Yu claimed that is a necessary and sufficient condition for all solutions of (1) to be oscillatory. In this paper a counterexample shows that the above result is not valid and the error in this paper is indicated.
- Published
- 1989
6. Dryness of discrete dams: comments on a paper by Tin and Phatarfod
- Author
-
K. Balagopal
- Subjects
Statistics and Probability ,Class (set theory) ,Stationary distribution ,General Mathematics ,chemistry.chemical_element ,chemistry ,Section (archaeology) ,medicine ,Applied mathematics ,Dryness ,medicine.symptom ,Statistics, Probability and Uncertainty ,Tin ,Mathematics - Abstract
The utilisation factor for a discrete dam, defined as the stationary probability of non-emptiness of the dam just before release, is obtained for a class of models that includes the Odoom–Lloyd model, the Anis–Lloyd model, the model of Herbert, etc. The method used points to a different approach to measuring dam utilisation via the actual utilisation, which appears to be more fruitful, and this is discussed in the last section.
- Published
- 1978
7. Remarks on the paper 'Transient Markov convolution semi-groups and the associated negative definite functions'
- Author
-
Masayuki ItÃ
- Subjects
Markov chain ,General Mathematics ,ComputingMethodologies_DOCUMENTANDTEXTPROCESSING ,43A35 ,Applied mathematics ,Transient (computer programming) ,60J30 ,Positive-definite matrix ,Algorithm ,60B15 ,Mathematics ,Convolution - Abstract
Let X be a locally compact and σ-compact abelian group and let denote the dual group of X. We denote by ξ a fixed Haar measure on X and by the Haar measure associated with ξ. In [2], we show the followingTheorem. Let (αt)t≧0 be a sub-Markov convolution semi-group on X and let ψ be the negative definite function associated with (αt)t≧0. Then (αt)t≧0 is transient if and only if Re (1/ψ) is locally -summable.
- Published
- 1986
8. A remark on R. Moeckel's paper ‘Geodesies on modular surfaces and continued fractions’
- Author
-
Toshihiro Nakanishi
- Subjects
Algebra ,Thesaurus (information retrieval) ,business.industry ,Applied Mathematics ,General Mathematics ,Modular design ,business ,Mathematics - Abstract
It is shown that a result by Moeckel holds not only for admissible subgroups of SL (2, ℤ), but also for arbitrary subgroups of finite index.
- Published
- 1989
9. Note on a paper of Tsuzuku
- Author
-
H. K. Farahat
- Subjects
Combinatorics ,Symmetric group ,Applied Mathematics ,General Mathematics ,Matrix representation ,Field (mathematics) ,Commutative ring ,Permutation matrix ,Permutation group ,Element (category theory) ,Unit (ring theory) ,Mathematics - Abstract
In [2], Tosiro Tsuzzuku gave a proof of the following:THEOREM. Let G be a doubly transitive permutation group of degree n, let K be any commutative ring with unit element and let p be the natural representation of G by n × n permutation matrices with elements 0, 1 in K. Then ρ is decomposable as a matrix representation over K if and only ifn is an invertible element of K.For G the symmetric group this result follows from Theorems (2.1) and (4.12) of [1]. The proof given by Tsuzuku is unsatisfactory, although it is perfectly valid when K is a field. The purpose of this note is to give a correct proof of the general case.
- Published
- 1964
10. Corrections to the paper ‘On orbits of unipotent flows on homogeneous spaces’
- Author
-
S. G. Dani
- Subjects
Homogeneous ,Applied Mathematics ,General Mathematics ,Mathematical analysis ,Unipotent ,Mathematics - Abstract
The author regrets that there are certain errors in [1] and would like to give the following corrections.
- Published
- 1986
11. Chaotic behavior of the p-adic Potts–Bethe mapping II
- Author
-
Otabek Khakimov and Farrukh Mukhamedov
- Subjects
Pure mathematics ,Applied Mathematics ,General Mathematics ,ComputingMethodologies_DOCUMENTANDTEXTPROCESSING ,Chaotic ,Mathematics - Abstract
The renormalization group method has been developed to investigate p-adic q-state Potts models on the Cayley tree of order k. This method is closely related to the examination of dynamical behavior of the p-adic Potts–Bethe mapping which depends on the parameters q, k. In Mukhamedov and Khakimov [Chaotic behavior of the p-adic Potts–Behte mapping. Discrete Contin. Dyn. Syst.38 (2018), 231–245], we have considered the case when q is not divisible by p and, under some conditions, it was established that the mapping is conjugate to the full shift on $\kappa _p$ symbols (here $\kappa _p$ is the greatest common factor of k and $p-1$ ). The present paper is a continuation of the forementioned paper, but here we investigate the case when q is divisible by p and k is arbitrary. We are able to fully describe the dynamical behavior of the p-adic Potts–Bethe mapping by means of a Markov partition. Moreover, the existence of a Julia set is established, over which the mapping exhibits a chaotic behavior. We point out that a similar result is not known in the case of real numbers (with rigorous proofs).
- Published
- 2021
12. Topologically mixing tiling of generated by a generalized substitution
- Author
-
Tyler M. White
- Subjects
Pure mathematics ,Applied Mathematics ,General Mathematics ,Substitution (logic) ,Mixing (physics) ,Mathematics - Abstract
This paper presents sufficient conditions for a substitution tiling dynamical system of $\mathbb {R}^2$ , generated by a generalized substitution on three letters, to be topologically mixing. These conditions are shown to hold on a large class of tiling substitutions originally presented by Kenyon in 1996. This problem was suggested by Boris Solomyak, and many of the techniques that are used in this paper are based on the work by Kenyon, Sadun, and Solomyak [Topological mixing for substitutions on two letters. Ergod. Th. & Dynam. Sys.25(6) (2005), 1919–1934]. They studied one-dimensional tiling dynamical systems generated by substitutions on two letters and provided similar conditions sufficient to ensure that one-dimensional substitution tiling dynamical systems are topologically mixing. If a tiling dynamical system of $\mathbb {R}^2$ satisfies our conditions (and thus is topologically mixing), we can construct additional topologically mixing tiling dynamical systems of $\mathbb {R}^2$ . By considering the stepped surface constructed from a tiling $T_\sigma $ , we can get a new tiling of $\mathbb {R}^2$ by projecting the surface orthogonally onto an irrational plane through the origin.
- Published
- 2021
13. Multiplicative constants and maximal measurable cocycles in bounded cohomology
- Author
-
Marco Moraschini, Alessio Savini, Moraschini M., and Savini A.
- Subjects
Pure mathematics ,Mathematics::Dynamical Systems ,Applied Mathematics ,General Mathematics ,Multiplicative function ,Lattice ,Geometric Topology (math.GT) ,Cohomology ,Mathematics - Geometric Topology ,Maximal cocycle ,Mathematics::Quantum Algebra ,Bounded function ,FOS: Mathematics ,Bounded cohomology ,Boundary map ,Invariant (mathematics) ,Zimmer cocycle ,Mathematics - Abstract
Multiplicative constants are a fundamental tool in the study of maximal representations. In this paper we show how to extend such notion, and the associated framework, to measurable cocycles theory. As an application of this approach, we define and study the Cartan invariant for measurable $\textup{PU}(m,1)$-cocycles of complex hyperbolic lattices., Comment: 35 pages; Major corrections along the paper following the referee's suggestions. To appear in Ergod. Theory Dyn. Syst
- Published
- 2021
14. Local limit theorems in relatively hyperbolic groups I: rough estimates
- Author
-
Matthieu Dussaule
- Subjects
Pure mathematics ,Series (mathematics) ,010201 computation theory & mathematics ,Spectral radius ,Applied Mathematics ,General Mathematics ,010102 general mathematics ,0102 computer and information sciences ,Limit (mathematics) ,0101 mathematics ,Random walk ,01 natural sciences ,Mathematics - Abstract
This is the first of a series of two papers dealing with local limit theorems in relatively hyperbolic groups. In this first paper, we prove rough estimates for the Green function. Along the way, we introduce the notion of relative automaticity which will be useful in both papers and we show that relatively hyperbolic groups are relatively automatic. We also define the notion of spectral positive recurrence for random walks on relatively hyperbolic groups. We then use our estimates for the Green function to prove that $p_n\asymp R^{-n}n^{-3/2}$ for spectrally positive-recurrent random walks, where $p_n$ is the probability of going back to the origin at time n and where R is the inverse of the spectral radius of the random walk.
- Published
- 2021
15. On moderate deviations in Poisson approximation
- Author
-
Qingwei Liu and Aihua Xia
- Subjects
Statistics and Probability ,Random graph ,Matching (graph theory) ,Distribution (number theory) ,General Mathematics ,Probability (math.PR) ,010102 general mathematics ,Poisson distribution ,01 natural sciences ,Birthday problem ,Normal distribution ,010104 statistics & probability ,symbols.namesake ,FOS: Mathematics ,Rare events ,symbols ,Applied mathematics ,Moderate deviations ,0101 mathematics ,Statistics, Probability and Uncertainty ,Primary 60F05, secondary 60E15 ,Mathematics - Probability ,Mathematics - Abstract
In this paper, we first use the distribution of the number of records to demonstrate that the right tail probabilities of counts of rare events are generally better approximated by the right tail probabilities of Poisson distribution than {those} of normal distribution. We then show the moderate deviations in Poisson approximation generally require an adjustment and, with suitable adjustment, we establish better error estimates of the moderate deviations in Poisson approximation than those in \cite{CFS}. Our estimates contain no unspecified constants and are easy to apply. We illustrate the use of the theorems in six applications: Poisson-binomial distribution, matching problem, occupancy problem, birthday problem, random graphs and 2-runs. The paper complements the works of \cite{CC92,BCC95,CFS}., 29 pages and 5 figures
- Published
- 2020
16. Extremality and dynamically defined measures, part II: Measures from conformal dynamical systems
- Author
-
Lior Fishman, Tushar Das, Mariusz Urbański, and David Simmons
- Subjects
Class (set theory) ,Pure mathematics ,Conjecture ,Mathematics - Number Theory ,Dynamical systems theory ,Applied Mathematics ,General Mathematics ,Diophantine equation ,010102 general mathematics ,11J13, 11J83, 28A75, 37F35 ,Open set ,Dynamical Systems (math.DS) ,Rational function ,01 natural sciences ,Measure (mathematics) ,010101 applied mathematics ,Hausdorff dimension ,FOS: Mathematics ,Number Theory (math.NT) ,Mathematics - Dynamical Systems ,0101 mathematics ,Mathematics - Abstract
We present a new method of proving the Diophantine extremality of various dynamically defined measures, vastly expanding the class of measures known to be extremal. This generalizes and improves the celebrated theorem of Kleinbock and Margulis [{\it Invent. Math.} {\bf 138}(3) (1999), 451--494] resolving Sprind\v zuk's conjecture, as well as its extension by Kleinbock, Lindenstrauss, and Weiss [On fractal measures and Diophantine approximation. {\it Selecta Math.} {\bf 10} (2004), 479--523], hereafter abbreviated KLW. As applications we prove the extremality of all hyperbolic measures of smooth dynamical systems with sufficiently large Hausdorff dimension, and of the Patterson--Sullivan measures of all nonplanar geometrically finite groups. The key technical idea, which has led to a plethora of new applications, is a significant weakening of KLW's sufficient conditions for extremality. In the first of this series of papers [{\it Selecta Math.} {\bf 24}(3) (2018), 2165--2206], we introduce and develop a systematic account of two classes of measures, which we call {\it quasi-decaying} and {\it weakly quasi-decaying}. We prove that weak quasi-decay implies strong extremality in the matrix approximation framework, as well as proving the ``inherited exponent of irrationality'' version of this theorem. In this paper, the second of the series, we establish sufficient conditions on various classes of conformal dynamical systems for their measures to be quasi-decaying. In particular, we prove the above-mentioned result about Patterson--Sullivan measures, and we show that equilibrium states (including conformal measures) of nonplanar infinite iterated function systems (including those which do not satisfy the open set condition) and rational functions are quasi-decaying., Comment: Link to Part I: arXiv:1504.04778
- Published
- 2020
17. Bernoulliness of when is an irrational rotation: towards an explicit isomorphism
- Author
-
Christophe Leuridan
- Subjects
Rational number ,Lebesgue measure ,Applied Mathematics ,General Mathematics ,010102 general mathematics ,Diophantine approximation ,01 natural sciences ,Irrational rotation ,Combinatorics ,0103 physical sciences ,010307 mathematical physics ,Bernoulli scheme ,Isomorphism ,0101 mathematics ,Real number ,Unit interval ,Mathematics - Abstract
Let $\unicode[STIX]{x1D703}$ be an irrational real number. The map $T_{\unicode[STIX]{x1D703}}:y\mapsto (y+\unicode[STIX]{x1D703})\!\hspace{0.6em}{\rm mod}\hspace{0.2em}1$ from the unit interval $\mathbf{I}= [\!0,1\![$ (endowed with the Lebesgue measure) to itself is ergodic. In a short paper [Parry, Automorphisms of the Bernoulli endomorphism and a class of skew-products. Ergod. Th. & Dynam. Sys.16 (1996), 519–529] published in 1996, Parry provided an explicit isomorphism between the measure-preserving map $[T_{\unicode[STIX]{x1D703}},\text{Id}]$ and the unilateral dyadic Bernoulli shift when $\unicode[STIX]{x1D703}$ is extremely well approximated by the rational numbers, namely, if $$\begin{eqnarray}\inf _{q\geq 1}q^{4}4^{q^{2}}~\text{dist}(\unicode[STIX]{x1D703},q^{-1}\mathbb{Z})=0.\end{eqnarray}$$ A few years later, Hoffman and Rudolph [Uniform endomorphisms which are isomorphic to a Bernoulli shift. Ann. of Math. (2)156 (2002), 79–101] showed that for every irrational number, the measure-preserving map $[T_{\unicode[STIX]{x1D703}},\text{Id}]$ is isomorphic to the unilateral dyadic Bernoulli shift. Their proof is not constructive. In the present paper, we relax notably Parry’s condition on $\unicode[STIX]{x1D703}$: the explicit map provided by Parry’s method is an isomorphism between the map $[T_{\unicode[STIX]{x1D703}},\text{Id}]$ and the unilateral dyadic Bernoulli shift whenever $$\begin{eqnarray}\inf _{q\geq 1}q^{4}~\text{dist}(\unicode[STIX]{x1D703},q^{-1}\mathbb{Z})=0.\end{eqnarray}$$ This condition can be relaxed again into $$\begin{eqnarray}\inf _{n\geq 1}q_{n}^{3}~(a_{1}+\cdots +a_{n})~|q_{n}\unicode[STIX]{x1D703}-p_{n}| where $[0;a_{1},a_{2},\ldots ]$ is the continued fraction expansion and $(p_{n}/q_{n})_{n\geq 0}$ the sequence of convergents of $\Vert \unicode[STIX]{x1D703}\Vert :=\text{dist}(\unicode[STIX]{x1D703},\mathbb{Z})$. Whether Parry’s map is an isomorphism for every $\unicode[STIX]{x1D703}$ or not is still an open question, although we expect a positive answer.
- Published
- 2020
18. Martingale decomposition of an L2 space with nonlinear stochastic integrals
- Author
-
Clarence Simard
- Subjects
Statistics and Probability ,Optimization problem ,General Mathematics ,010102 general mathematics ,Stochastic calculus ,01 natural sciences ,010104 statistics & probability ,Nonlinear system ,Integrator ,Bounded function ,Applied mathematics ,0101 mathematics ,Statistics, Probability and Uncertainty ,Lp space ,Martingale (probability theory) ,Brownian motion ,Mathematics - Abstract
This paper generalizes the Kunita–Watanabe decomposition of an $L^2$ space. The generalization comes from using nonlinear stochastic integrals where the integrator is a family of continuous martingales bounded in $L^2$ . This result is also the solution of an optimization problem in $L^2$ . First, martingales are assumed to be stochastic integrals. Then, to get the general result, it is shown that the regularity of the family of martingales with respect to its spatial parameter is inherited by the integrands in the integral representation of the martingales. Finally, an example showing how the results of this paper, with the Clark–Ocone formula, can be applied to polynomial functions of Brownian integrals.
- Published
- 2019
19. Type classification of extreme quantized characters
- Author
-
Ryosuke Sato
- Subjects
Pure mathematics ,Dynamical systems theory ,Applied Mathematics ,General Mathematics ,010102 general mathematics ,Context (language use) ,01 natural sciences ,Representation theory ,Quantization (physics) ,symbols.namesake ,Character (mathematics) ,Operator algebra ,0103 physical sciences ,symbols ,010307 mathematical physics ,0101 mathematics ,Quantum ,Mathematics ,Von Neumann architecture - Abstract
The notion of quantized characters was introduced in our previous paper as a natural quantization of characters in the context of asymptotic representation theory forquantum groups. As in the case of ordinary groups, the representation associated with any extreme quantized character generates a von Neumann factor. From the viewpoint of operator algebras (and measurable dynamical systems), it is natural to ask what is the Murray–von Neumann–Connes type of the resulting factor. In this paper, we give a complete solution to this question when the inductive system is of quantum unitary groups $U_{q}(N)$.
- Published
- 2019
20. Approximate lumpability for Markovian agent-based models using local symmetries
- Author
-
Wasiur R. KhudaBukhsh, Arnab Auddy, Heinz Koeppl, and Yann Disser
- Subjects
Statistics and Probability ,Random graph ,Markov chain ,General Mathematics ,Probability (math.PR) ,Lumpability ,Neighbourhood (graph theory) ,Markov process ,020206 networking & telecommunications ,0102 computer and information sciences ,02 engineering and technology ,01 natural sciences ,symbols.namesake ,60J28 ,010201 computation theory & mathematics ,Approximation error ,Local symmetry ,FOS: Mathematics ,0202 electrical engineering, electronic engineering, information engineering ,symbols ,State space ,Applied mathematics ,Statistics, Probability and Uncertainty ,Mathematics - Probability ,Mathematics - Abstract
We study a Markovian agent-based model (MABM) in this paper. Each agent is endowed with a local state that changes over time as the agent interacts with its neighbours. The neighbourhood structure is given by a graph. In a recent paper [Simon et al. 2011], the authors used the automorphisms of the underlying graph to generate a lumpable partition of the joint state space ensuring Markovianness of the lumped process for binary dynamics. However, many large random graphs tend to become asymmetric rendering the automorphism-based lumping approach ineffective as a tool of model reduction. In order to mitigate this problem, we propose a lumping method based on a notion of local symmetry, which compares only local neighbourhoods of vertices. Since local symmetry only ensures approximate lumpability, we quantify the approximation error by means of Kullback-Leibler divergence rate between the original Markov chain and a lifted Markov chain. We prove the approximation error decreases monotonically. The connections to fibrations of graphs are also discussed., Comment: 28 pages, 4 figures
- Published
- 2019
21. Weak containment of measure-preserving group actions
- Author
-
Alexander S. Kechris and Peter Burton
- Subjects
Containment (computer programming) ,Group action ,Applied Mathematics ,General Mathematics ,010102 general mathematics ,0103 physical sciences ,Calculus ,Measure (physics) ,010307 mathematical physics ,0101 mathematics ,01 natural sciences ,Weak equivalence ,Mathematics - Abstract
This paper concerns the study of the global structure of measure-preserving actions of countable groups on standard probability spaces. Weak containment is a hierarchical notion of complexity of such actions, motivated by an analogous concept in the theory of unitary representations. This concept gives rise to an associated notion of equivalence of actions, called weak equivalence, which is much coarser than the notion of isomorphism (conjugacy). It is well understood now that, in general, isomorphism is a very complex notion, a fact which manifests itself, for example, in the lack of any reasonable structure in the space of actions modulo isomorphism. On the other hand, the space of weak equivalence classes is quite well behaved. Another interesting fact that relates to the study of weak containment is that many important parameters associated with actions, such as the type, cost, and combinatorial parameters, turn out to be invariants of weak equivalence and in fact exhibit desirable monotonicity properties with respect to the pre-order of weak containment, a fact that can be useful in certain applications. There has been quite a lot of activity in this area in the last few years, and our goal in this paper is to provide a survey of this work.
- Published
- 2019
22. ON THE BILINEAR SQUARE FOURIER MULTIPLIER OPERATORS ASSOCIATED WITH FUNCTION
- Author
-
Zhengyang Li and Qingying Xue
- Subjects
Multiplier (Fourier analysis) ,symbols.namesake ,Fourier transform ,010308 nuclear & particles physics ,General Mathematics ,010102 general mathematics ,0103 physical sciences ,symbols ,Applied mathematics ,Bilinear interpolation ,0101 mathematics ,01 natural sciences ,Mathematics - Abstract
This paper will be devoted to study a class of bilinear square-function Fourier multiplier operator associated with a symbol $m$ defined by $$\begin{eqnarray}\displaystyle & & \displaystyle \mathfrak{T}_{\unicode[STIX]{x1D706},m}(f_{1},f_{2})(x)\nonumber\\ \displaystyle & & \displaystyle \quad =\Big(\iint _{\mathbb{R}_{+}^{n+1}}\Big(\frac{t}{|x-z|+t}\Big)^{n\unicode[STIX]{x1D706}}\nonumber\\ \displaystyle & & \displaystyle \qquad \times \,\bigg|\int _{(\mathbb{R}^{n})^{2}}e^{2\unicode[STIX]{x1D70B}ix\cdot (\unicode[STIX]{x1D709}_{1}+\unicode[STIX]{x1D709}_{2})}m(t\unicode[STIX]{x1D709}_{1},t\unicode[STIX]{x1D709}_{2})\hat{f}_{1}(\unicode[STIX]{x1D709}_{1})\hat{f}_{2}(\unicode[STIX]{x1D709}_{2})\,d\unicode[STIX]{x1D709}_{1}\,d\unicode[STIX]{x1D709}_{2}\bigg|^{2}\frac{dz\,dt}{t^{n+1}}\Big)^{1/2}.\nonumber\end{eqnarray}$$ A basic fact about $\mathfrak{T}_{\unicode[STIX]{x1D706},m}$ is that it is closely associated with the multilinear Littlewood–Paley $g_{\unicode[STIX]{x1D706}}^{\ast }$ function. In this paper we first investigate the boundedness of $\mathfrak{T}_{\unicode[STIX]{x1D706},m}$ on products of weighted Lebesgue spaces. Then, the weighted endpoint $L\log L$ type estimate and strong estimate for the commutators of $\mathfrak{T}_{\unicode[STIX]{x1D706},m}$ will be demonstrated.
- Published
- 2018
23. Positive periodic solutions for singular fourth-order differential equations with a deviating argument
- Author
-
Fanchao Kong and Zaitao Liang
- Subjects
010101 applied mathematics ,Fourth order ,Singularity ,Differential equation ,Argument ,General Mathematics ,010102 general mathematics ,Applied mathematics ,Continuation theorem ,0101 mathematics ,01 natural sciences ,Mathematics - Abstract
In this paper, we study the singular fourth-order differential equation with a deviating argument:By using Mawhin's continuation theorem and some analytic techniques, we establish some criteria to guarantee the existence of positive periodic solutions. The significance of this paper is that g has a strong singularity at x = 0 and satisfies a small force condition at x = ∞, which is different from the known ones in the literature.
- Published
- 2018
24. Local rigidity of higher rank non-abelian action on torus
- Author
-
Zhenqi Jenny Wang
- Subjects
Pure mathematics ,Mathematics::Dynamical Systems ,Rigidity (electromagnetism) ,Applied Mathematics ,General Mathematics ,Torus ,Abelian group ,Mathematics - Abstract
In this paper, we show local smooth rigidity for higher rank ergodic nilpotent action by toral automorphisms. In former papers all examples for actions enjoying the local smooth rigidity phenomenon are higher rank and have no rank-one factors. In this paper we give examples of smooth rigidity of actions having rank-one factors. The method is a generalization of the KAM (Kolmogorov–Arnold–Moser) iterative scheme.
- Published
- 2017
25. Purely exponential growth of cusp-uniform actions
- Author
-
Wenyuan Yang
- Subjects
Cusp (singularity) ,Pure mathematics ,Lemma (mathematics) ,Mathematics::Dynamical Systems ,Group (mathematics) ,Applied Mathematics ,General Mathematics ,010102 general mathematics ,Metric Geometry (math.MG) ,Group Theory (math.GR) ,Dynamical Systems (math.DS) ,01 natural sciences ,Mathematics - Metric Geometry ,Exponential growth ,0103 physical sciences ,Shadow ,FOS: Mathematics ,Primary 20F65, 20F67 ,Countable set ,010307 mathematical physics ,Preprint ,Mathematics - Dynamical Systems ,0101 mathematics ,Mathematics - Group Theory ,Mathematics - Abstract
Suppose that a countable group $G$ admits a cusp-uniform action on a hyperbolic space $(X,d)$ such that $G$ is of divergent type. The main result of the paper is characterizing the purely exponential growth type of the orbit growth function by a condition introduced by Dal'bo-Otal-Peign\'e. For geometrically finite Cartan-Hadamard manifolds with pinched negative curvature this condition ensures the finiteness of Bowen-Margulis-Sullivan measures. In this case, our result recovers a theorem of Roblin (in a weaker form). Our main tool is the Patterson-Sullivan measures on the Gromov boundary of $X$, and a variant of the Sullivan shadow lemma called partial shadow lemma. This allows us to prove that the purely exponential growth of either cones, or partial cones or horoballs is also equivalent to the condition of Dal'bo-Otal-Peign\'e. These results are further used in the paper \cite{YANG7}., Comment: Version 2: 34 pages, 2 figures. Sections 4 and 5 was rewritten following suggestions of the referee. Paper accepted by Ergodic Theory and Dynamical Systems
- Published
- 2017
26. Generalized Lagrange multiplier rule for non-convex vector optimization problems
- Author
-
Maria Bernadette Donato
- Subjects
021103 operations research ,Augmented Lagrangian method ,General Mathematics ,010102 general mathematics ,Tangent cone ,0211 other engineering and technologies ,Regular polygon ,02 engineering and technology ,01 natural sciences ,Constraint (information theory) ,symbols.namesake ,Constraint algorithm ,Vector optimization ,Lagrange multiplier rule, vector optimization problems, tangent cone ,Lagrange multiplier ,symbols ,Applied mathematics ,Differentiable function ,0101 mathematics ,Mathematics - Abstract
In this paper a non-convex vector optimization problem among infinite-dimensional spaces is presented. In particular, a generalized Lagrange multiplier rule is formulated as a necessary and sufficient optimality condition for weakly minimal solutions of a constrained vector optimization problem, without requiring that the ordering cone that defines the inequality constraints has non-empty interior. This paper extends the result of Donato (J. Funct. Analysis261 (2011), 2083–2093) to the general setting of vector optimization by introducing a constraint qualification assumption that involves the Fréchet differentiability of the maps and the tangent cone to the image set. Moreover, the constraint qualification is a necessary and sufficient condition for the Lagrange multiplier rule to hold.
- Published
- 2016
27. Quadratic stochastic operators and zero-sum game dynamics
- Author
-
Rasul N. Ganikhodjaev, U. U. Jamilov, and Nasir Ganikhodjaev
- Subjects
Discrete mathematics ,Volterra operator ,Simplex ,Applied Mathematics ,General Mathematics ,Volterra integral equation ,Quasinormal operator ,Semi-elliptic operator ,symbols.namesake ,Operator (computer programming) ,Zero-sum game ,symbols ,Invariant (mathematics) ,Mathematics - Abstract
In this paper we consider the set of all extremal Volterra quadratic stochastic operators defined on a unit simplex $S^{4}$ and show that such operators can be reinterpreted in terms of zero-sum games. We show that an extremal Volterra operator is non-ergodic and an appropriate zero-sum game is a rock-paper-scissors game if either the Volterra operator is a uniform operator or for a non-uniform Volterra operator $V$ there exists a subset $I\subset \{1,2,3,4,5\}$ with $|I|\leq 2$ such that $\sum _{i\in I}(V^{n}\mathbf{x})_{i}\rightarrow 0,$ and the restriction of $V$ on an invariant face ${\rm\Gamma}_{I}=\{\mathbf{x}\in S^{m-1}:x_{i}=0,i\in I\}$ is a uniform Volterra operator.
- Published
- 2014
28. An uncountable Furstenberg–Zimmer structure theory
- Author
-
Asgar Jamneshan, Jamneshan, Asgar (ORCID 0000-0002-1450-6569 & YÖK ID 332404), College of Sciences, and Department of Mathematics
- Subjects
Applied Mathematics ,General Mathematics ,Structure theory ,Measure preserving systems ,Ergodic theory ,Mathematics - Abstract
Furstenberg-Zimmer structure theory refers to the extension of the dichotomy between the compact and weakly mixing parts of a measure-preserving dynamical system and the algebraic and geometric descriptions of such parts to a conditional setting, where such dichotomy is established relative to a factor and conditional analogs of those algebraic and geometric descriptions are sought. Although the unconditional dichotomy and the characterizations are known for arbitrary systems, the relative situation is understood under certain countability and separability hypotheses on the underlying groups and spaces. The aim of this article is to remove these restrictions in the relative situation and establish a Furstenberg-Zimmer structure theory in full generality. As an independent byproduct, we establish a connection between the relative analysis of systems in ergodic theory and the internal logic in certain Boolean topoi., A.J. was supported by DFG-research fellowship JA 2512/3-1. A.J. offers his thanks to Terence Tao for suggesting this project, many helpful discussions, and his encouragement and support. He is grateful to Pieter Spaas for several helpful discussions. A.J. thanks Markus Haase for organizing an online workshop on structural ergodic theory where the results of this paper and the parallel work could be discussed, and Nikolai Edeko, Markus Haase, and Henrik Kreidler for helpful comments on an early version of the manuscript. A.J. is indebted to the anonymous referee for several useful suggestions and corrections.
- Published
- 2022
29. Convergence Rates in the Implicit Renewal Theorem on Trees
- Author
-
Predrag R. Jelenković and Mariana Olvera-Cravioto
- Subjects
Statistics and Probability ,large deviation ,General Mathematics ,Power law ,Branching (linguistics) ,multiplicative cascade ,60K05 ,Branching random walk ,60H25 ,Applied mathematics ,weighted branching process ,Mathematics ,Discrete mathematics ,smoothing transform ,60J80 ,power law ,stochastic fixed-point equation ,stochastic recursion ,Nonlinear system ,Rate of convergence ,branching random walk ,Renewal theorem ,Statistics, Probability and Uncertainty ,Multiplicative cascade ,Implicit renewal theory ,rate of convergence ,60F10 - Abstract
We consider possibly nonlinear distributional fixed-point equations on weighted branching trees, which include the well-known linear branching recursion. In Jelenković and Olvera-Cravioto (2012), an implicit renewal theorem was developed that enables the characterization of the power-tail asymptotics of the solutions to many equations that fall into this category. In this paper we complement the analysis in our 2012 paper to provide the corresponding rate of convergence.
- Published
- 2013
30. Ruelle operator with weakly contractive iterated function systems
- Author
-
Yuan-Ling Ye
- Subjects
Sequence ,Pure mathematics ,Operator (computer programming) ,Iterated function system ,Dynamical systems theory ,Triple system ,Applied Mathematics ,General Mathematics ,Lipschitz continuity ,Mathematics - Abstract
The Ruelle operator has been studied extensively both in dynamical systems and iterated function systems (IFSs). Given a weakly contractive IFS $(X, \{w_j\}_{j=1}^m)$ and an associated family of positive continuous potential functions $\{p_j\}_{j=1}^m$, a triple system $(X, \{w_j\}_{j=1}^m, \{p_j\}_{j=1}^m)$is set up. In this paper we study Ruelle operators associated with the triple systems. The paper presents an easily verified condition. Under this condition, the Ruelle operator theorem holds provided that the potential functions are Dini continuous. Under the same condition, the Ruelle operator is quasi-compact, and the iterations sequence of the Ruelle operator converges with a specific geometric rate, if the potential functions are Lipschitz continuous.
- Published
- 2012
31. Dynamical profile of a class of rank-one attractors
- Author
-
Qiudong Wang and Lai Sang Young
- Subjects
Pure mathematics ,Mathematics::Dynamical Systems ,Rank (linear algebra) ,Dynamical systems theory ,Differential equation ,Applied Mathematics ,General Mathematics ,Lyapunov exponent ,Nonlinear Sciences::Chaotic Dynamics ,symbols.namesake ,Attractor ,symbols ,Ergodic theory ,Large deviations theory ,Central limit theorem ,Mathematics - Abstract
This paper contains results on the geometric and ergodic properties of a class of strange attractors introduced by Wang and Young [Towards a theory of rank one attractors. Ann. of Math. (2) 167 (2008), 349–480]. These attractors can live in phase spaces of any dimension, and have been shown to arise naturally in differential equations that model several commonly occurring phenomena. Dynamically, such systems are chaotic; they have controlled non-uniform hyperbolicity with exactly one unstable direction, hence the name rank-one. In this paper we prove theorems on their Lyapunov exponents, Sinai–Ruelle–Bowen (SRB) measures, basins of attraction, and statistics of time series, including central limit theorems, exponential correlation decay and large deviations. We also present results on their global geometric and combinatorial structures, symbolic coding and periodic points. In short, we build a dynamical profile for this class of dynamical systems, proving that these systems exhibit many of the characteristics normally associated with ‘strange attractors’.
- Published
- 2012
32. Non-standard real-analytic realizations of some rotations of the circle – CORRIGENDUM
- Author
-
Shilpak Banerjee
- Subjects
Algebra ,Applied Mathematics ,General Mathematics ,010102 general mathematics ,0103 physical sciences ,010307 mathematical physics ,0101 mathematics ,01 natural sciences ,Mathematics - Abstract
We correct two technical errors in the original paper. The main result in the original paper remains valid without any changes.
- Published
- 2016
33. Strong renewal theorems and Lyapunov spectra forα-Farey andα-Lüroth systems
- Author
-
Marc Kesseböhmer, Sara Munday, and Bernd O. Stratmann
- Subjects
Lyapunov function ,Pure mathematics ,Gauss map ,Computer Science::Information Retrieval ,Applied Mathematics ,General Mathematics ,symbols.namesake ,Number theory ,symbols ,Countable set ,Farey sequence ,Ergodic theory ,Partition (number theory) ,Mathematics ,Unit interval - Abstract
In this paper, we introduce and study theα-Farey map and its associated jump transformation, theα-Lüroth map, for an arbitrary countable partitionαof the unit interval with atoms which accumulate only at the origin. These maps represent linearized generalizations of the Farey map and the Gauss map from elementary number theory. First, a thorough analysis of some of their topological and ergodic theoretical properties is given, including establishing exactness for both types of these maps. The first main result then is to establish weak and strong renewal laws for what we have calledα-sum-level sets for theα-Lüroth map. Similar results have previously been obtained for the Farey map and the Gauss map by using infinite ergodic theory. In this respect, a side product of the paper is to allow for greater transparency of some of the core ideas of infinite ergodic theory. The second remaining result is to obtain a complete description of the Lyapunov spectra of theα-Farey map and theα-Lüroth map in terms of the thermodynamical formalism. We show how to derive these spectra and then give various examples which demonstrate the diversity of their behaviours in dependence on the chosen partitionα.
- Published
- 2011
34. ON THE SOLVABILITY OF SYSTEMS OF SUM–PRODUCT EQUATIONS IN FINITE FIELDS
- Author
-
Le Anh Vinh
- Subjects
Finite field ,General Mathematics ,Product (mathematics) ,Applied mathematics ,Mathematics - Abstract
In an earlier paper, for ‘large’ (but otherwise unspecified) subsets , , , of q, Sárközy showed the solvability of the equations a + b = cd with a ∈ , b ∈ , c ∈ , d ∈ . This equation has been studied recently by many other authors. In this paper, we study the solvability of systems of equations of this type using additive character sums.
- Published
- 2011
35. Fisher information and statistical inference for phase-type distributions
- Author
-
Mogens Bladt, Bo Friis Nielsen, and Luz Judith R. Esparza
- Subjects
Statistics and Probability ,Fisher information ,General Mathematics ,Fisher kernel ,Fisher consistency ,Newton--Raphson ,symbols.namesake ,60J27 ,Observed information ,Scoring algorithm ,Expectation–maximization algorithm ,Statistics ,symbols ,Fiducial inference ,60J10 ,Applied mathematics ,62F25 ,60J75 ,Statistics, Probability and Uncertainty ,EM algorithm ,Likelihood function ,Phase-type distribution ,Mathematics - Abstract
This paper is concerned with statistical inference for both continuous and discrete phase-type distributions. We consider maximum likelihood estimation, where traditionally the expectation-maximization (EM) algorithm has been employed. Certain numerical aspects of this method are revised and we provide an alternative method for dealing with the E-step. We also compare the EM algorithm to a direct Newton–Raphson optimization of the likelihood function. As one of the main contributions of the paper, we provide formulae for calculating the Fisher information matrix both for the EM algorithm and Newton–Raphson approach. The inverse of the Fisher information matrix provides the variances and covariances of the estimated parameters.
- Published
- 2011
36. Dimension of the generalized 4-corner set and its projections
- Author
-
Balázs Bárány
- Subjects
Discrete mathematics ,Set (abstract data type) ,Iterated function system ,Dimension (vector space) ,Applied Mathematics ,General Mathematics ,Computation ,Hausdorff dimension ,Hausdorff space ,Dimension theory ,Calculus ,Fixed point ,Mathematics - Abstract
In the last two decades, considerable attention has been paid to the dimension theory of self-affine sets. In the case of generalized 4-corner sets (see Figure 1), the iterated function systems obtained as the projections of self-affine systems have maps of common fixed points. In this paper, we extend our result [B. Bárány. On the Hausdorff dimension of a family of self-similar sets with complicated overlaps. Fund. Math. 206 (2009), 49–59], which introduced a new method of computation of the box and Hausdorff dimensions of self-similar families where some of the maps have common fixed points. The extended version of our method presented in this paper makes it possible to determine the box dimension of the generalized 4-corner set for Lebesgue-typical contracting parameters.
- Published
- 2011
37. Differentiating potential functions of SRB measures on hyperbolic attractors
- Author
-
Miaohua Jiang
- Subjects
Pure mathematics ,Applied Mathematics ,General Mathematics ,Derivative ,Chain rule ,Measure (mathematics) ,Manifold ,Volume form ,symbols.namesake ,Attractor ,Jacobian matrix and determinant ,symbols ,Differentiable function ,Mathematics - Abstract
The derivation of Ruelle’s derivative formula of the SRB measure depends largely on the calculation of the derivative of the unstable Jacobian. Although Ruelle’s derivative formula is correct, the proofs in the original paper and its corrigendum are not complete. In this paper, we re-visit the differentiation process of the unstable Jacobian and provide a complete derivation of its derivative formula. Our approach is to extend the volume form provided by the SRB measure on local unstable manifolds to a system of Hölder continuous local Riemannian metrics on the manifold so that under this system of local metrics, the unstable Jacobian becomes differentiable with respect to the base point and its derivative with respect to the map can be obtained by the chain rule.
- Published
- 2011
38. Invariant rigid geometric structures and expanding maps
- Author
-
Yong Fang
- Subjects
Chaotic dynamical systems ,Pure mathematics ,Closed manifold ,Rigidity (electromagnetism) ,Homogeneous ,Applied Mathematics ,General Mathematics ,Invariant (mathematics) ,Algorithm ,Mathematics - Abstract
In the first part of this paper, we consider several natural problems about locally homogeneous rigid geometric structures. In particular, we formulate a notion of topological completeness which is adapted to the study of global rigidity of chaotic dynamical systems. In the second part of the paper, we prove the following result: let φ be a C∞ expanding map of a closed manifold. If φ preserves a topologically complete C∞ rigid geometric structure, then φ is C∞ conjugate to an expanding infra-nilendomorphism.
- Published
- 2011
39. On maximal pattern complexity of some automatic words
- Author
-
Pavel V. Salimov and Teturo Kamae
- Subjects
Combinatorics ,Discrete mathematics ,Linear function (calculus) ,Applied Mathematics ,General Mathematics ,Bounded function ,Substitution (logic) ,Value (computer science) ,Function (mathematics) ,Fixed point ,Constant (mathematics) ,Word (group theory) ,Mathematics - Abstract
The pattern complexity of a word for a given pattern S, where S is a finite subset of {0,1,2,…}, is the number of distinct restrictions of the word to S+n (with n=0,1,2,…). The maximal pattern complexity of the word, introduced in the paper of T. Kamae and L. Zamboni [Sequence entropy and the maximal pattern complexity of infinite words. Ergod. Th. & Dynam. Sys.22(4) (2002), 1191–1199], is the maximum value of the pattern complexity of S with #S=k as a function of k=1,2,…. A substitution of constant length on an alphabet is a mapping from the alphabet to finite words on it of constant length not less than two. An infinite word is called a fixed point of the substitution if it stays the same after the substitution is applied. In this paper, we prove that the maximal pattern complexity of a fixed point of a substitution of constant length on {0,1} (as a function of k=1,2,…) is either bounded, a linear function of k, or 2k.
- Published
- 2010
40. WEAK CONVERGENCE OF AN ITERATIVE SCHEME FOR GENERALIZED EQUILIBRIUM PROBLEMS
- Author
-
Jian-Wen Peng and Jen-Chih Yao
- Subjects
Set (abstract data type) ,Monotone polygon ,Weak convergence ,General Mathematics ,Scheme (mathematics) ,Mathematical analysis ,Variational inequality ,Applied mathematics ,Common element ,Equilibrium problem ,Fixed point ,Mathematics - Abstract
In this paper, we introduce an iterative scheme using an extragradient method for finding a common element of the set of solutions of a generalized equilibrium problem, the set of fixed points of a nonexpansive mapping and the set of the variational inequality for a monotone, Lipschitz-continuous mapping. We obtain a weak convergence theorem for three sequences generated by this process. Based on this result, we also obtain several interesting results. The results in this paper generalize and extend some well-known weak convergence theorems in the literature.
- Published
- 2009
41. Lambda-topology versus pointwise topology
- Author
-
Mariusz Urbański, Hiroki Sumi, and Mario Roy
- Subjects
Pointwise ,Pointwise convergence ,Dense set ,Applied Mathematics ,General Mathematics ,Hausdorff dimension ,Metrization theorem ,Natural topology ,Invariant (mathematics) ,Topology ,Axiom of countability ,Mathematics - Abstract
This paper deals with families of conformal iterated function systems (CIFSs). The space CIFS(X,I) of all CIFSs, with common seed space X and alphabet I, is successively endowed with the topology of pointwise convergence and the so-calledλ-topology. We show just how bad the topology of pointwise convergence is: although the Hausdorff dimension function is continuous on a dense Gδ-set, it is also discontinuous on a dense subset of CIFS(X,I). Moreover, all of the different types of systems (irregular, critically regular, etc.), have empty interior, have the whole space as boundary, and thus are dense in CIFS(X,I), which goes against intuition and conception of a natural topology on CIFS(X,I). We then prove how good the λ-topology is: Roy and Urbański [Regularity properties of Hausdorff dimension in infinite conformal IFSs. Ergod. Th. & Dynam. Sys.25(6) (2005), 1961–1983] have previously pointed out that the Hausdorff dimension function is then continuous everywhere on CIFS(X,I). We go further in this paper. We show that (almost) all of the different types of systems have natural topological properties. We also show that, despite not being metrizable (as it does not satisfy the first axiom of countability), the λ-topology makes the space CIFS(X,I) normal. Moreover, this space has no isolated points. We further prove that the conformal Gibbs measures and invariant Gibbs measures depend continuously on Φ∈CIFS(X,I) and on the parameter t of the potential and pressure functions. However, we demonstrate that the coding map and the closure of the limit set are discontinuous on an important subset of CIFS(X,I).
- Published
- 2009
42. Parameter rays in the space of exponential maps
- Author
-
Dierk Schleicher and Markus Förster
- Subjects
Set (abstract data type) ,Pure mathematics ,Applied Mathematics ,General Mathematics ,Orbit (dynamics) ,Structure (category theory) ,Geometry ,Parameter space ,Space (mathematics) ,Mathematics ,Exponential function - Abstract
We investigate the setIof parametersκ∈ℂ for which the singular orbit (0,eκ,…) ofEκ(z):=exp (z+κ) converges to$\infty $. These parameters are organized in curves in parameter space calledparameter rays, together with endpoints of certain rays. Parameter rays are an important tool to understand the detailed structure of exponential parameter space. In this paper, we construct and investigate these parameter rays. Based on these results, a complete classification of the setIis given in the following paper [M. Förster, L. Rempe and D. Schleicher. Classification of escaping exponential maps.Proc. Amer. Math. Soc.136(2008), 651–663].
- Published
- 2009
43. STATIONARY SOLUTIONS TO FOREST KINEMATIC MODEL
- Author
-
Tohru Tsujikawa, Le Huy Chuan, and Atsushi Yagi
- Subjects
Homogeneous ,General Mathematics ,Forest ecology ,Structure (category theory) ,Applied mathematics ,Boundary (topology) ,Kinematics ,Dynamical system ,Instability ,Stability (probability) ,Mathematics - Abstract
We continue the study of a mathematical model for a forest ecosystem which has been presented by Y. A. Kuznetsov, M. Y. Antonovsky, V. N. Biktashev and A. Aponina (A cross-diffusion model of forest boundary dynamics, J. Math. Biol. 32 (1994), 219–232). In the preceding two papers (L. H. Chuan and A. Yagi, Dynamical systemfor forest kinematic model, Adv. Math. Sci. Appl. 16 (2006), 393–409; L. H. Chuan, T. Tsujikawa and A. Yagi, Aysmptotic behavior of solutions for forest kinematic model, Funkcial. Ekvac. 49 (2006), 427–449), the present authors already constructed a dynamical system and investigated asymptotic behaviour of trajectories of the dynamical system. This paper is then devoted to studying not only the structure (including stability and instability) of homogeneous stationary solutions but also the existence of inhomogeneous stationary solutions. Especially it shall be shown that in some cases, one can construct an infinite number of discontinuous stationary solutions.
- Published
- 2009
44. On transform orders for largest claim amounts
- Author
-
Yiying Zhang
- Subjects
Statistics and Probability ,Set (abstract data type) ,Hazard (logic) ,Skewness ,General Mathematics ,Regular polygon ,Applied mathematics ,Statistics, Probability and Uncertainty ,Star (graph theory) ,Majorization ,Upper and lower bounds ,Mathematics ,Exponential function - Abstract
This paper investigates the ordering properties of largest claim amounts in heterogeneous insurance portfolios in the sense of some transform orders, including the convex transform order and the star order. It is shown that the largest claim amount from a set of independent and heterogeneous exponential claims is more skewed than that from a set of independent and homogeneous exponential claims in the sense of the convex transform order. As a result, a lower bound for the coefficient of variation of the largest claim amount is established without any restrictions on the parameters of the distributions of claim severities. Furthermore, sufficient conditions are presented to compare the skewness of the largest claim amounts from two sets of independent multiple-outlier scaled claims according to the star order. Some comparison results are also developed for the multiple-outlier proportional hazard rates claims. Numerical examples are presented to illustrate these theoretical results.
- Published
- 2021
45. The K-property for some unique equilibrium states in flows and homeomorphisms
- Author
-
Benjamin Call
- Subjects
Pure mathematics ,Property (philosophy) ,Applied Mathematics ,General Mathematics ,010102 general mathematics ,01 natural sciences ,Decomposition theory ,Set (abstract data type) ,Flow (mathematics) ,0103 physical sciences ,ComputingMethodologies_DOCUMENTANDTEXTPROCESSING ,010307 mathematical physics ,0101 mathematics ,Orbit (control theory) ,Mathematics - Abstract
We set out some general criteria to prove the K-property, refining the assumptions used in an earlier paper for the flow case, and introducing the analogous discrete-time result. We also introduce one-sided $\lambda $ -decompositions, as well as multiple techniques for checking the pressure gap required to show the K-property. We apply our results to the family of Mañé diffeomorphisms and the Katok map. Our argument builds on the orbit decomposition theory of Climenhaga and Thompson.
- Published
- 2021
46. Limit theorems for numbers of multiple returns in non-conventional arrays
- Author
-
Yuri Kifer
- Subjects
Applied Mathematics ,General Mathematics ,Applied mathematics ,Limit (mathematics) ,Mathematics - Abstract
For a $\psi $ -mixing process $\xi _0,\xi _1,\xi _2,\ldots $ we consider the number ${\mathcal N}_N$ of multiple returns $\{\xi _{q_{i,N}(n)}\in {\Gamma }_N,\, i=1,\ldots ,\ell \}$ to a set ${\Gamma }_N$ for n until either a fixed number N or until the moment $\tau _N$ when another multiple return $\{\xi _{q_{i,N}(n)}\in {\Delta }_N,\, i=1,\ldots ,\ell \}$ , takes place for the first time where ${\Gamma }_N\cap {\Delta }_N=\emptyset $ and $q_{i,N}$ , $i=1,\ldots ,\ell $ are certain functions of n taking on non-negative integer values when n runs from 0 to N. The dependence of $q_{i,N}(n)$ on both n and N is the main novelty of the paper. Under some restrictions on the functions $q_{i,N}$ we obtain Poisson distributions limits of ${\mathcal N}_N$ when counting is until N as $N\to \infty $ and geometric distributions limits when counting is until $\tau _N$ as $N\to \infty $ . We obtain also similar results in the dynamical systems setup considering a $\psi $ -mixing shift T on a sequence space ${\Omega }$ and studying the number of multiple returns $\{ T^{q_{i,N}(n)}{\omega }\in A^a_n,\, i=1,\ldots ,\ell \}$ until the first occurrence of another multiple return $\{ T^{q_{i,N}(n)}{\omega }\in A^b_m,\, i=1,\ldots ,\ell \}$ where $A^a_n,\, A_m^b$ are cylinder sets of length n and m constructed by sequences $a,b\in {\Omega }$ , respectively, and chosen so that their probabilities have the same order.
- Published
- 2021
47. Effective equidistribution for generalized higher-step nilflows
- Author
-
Minsung Kim
- Subjects
Nilpotent ,Pure mathematics ,Polynomial ,Equidistributed sequence ,Mathematics::Dynamical Systems ,Flow (mathematics) ,Applied Mathematics ,General Mathematics ,Diophantine equation ,Ergodic theory ,Measure (mathematics) ,Projection (linear algebra) ,Mathematics - Abstract
In this paper we prove bounds for ergodic averages for nilflows on general higher-step nilmanifolds. Under Diophantine condition on the frequency of a toral projection of the flow, we prove that almost all orbits become equidistributed at polynomial speed. We analyze the rate of decay which is determined by the number of steps and structure of general nilpotent Lie algebras. Our main result follows from the technique of controlling scaling operators in irreducible representations and measure estimation on close return orbits on general nilmanifolds.
- Published
- 2021
48. The geometric index and attractors of homeomorphisms of
- Author
-
Héctor Barge and J. J. Sánchez-Gabites
- Subjects
Pure mathematics ,Index (economics) ,Applied Mathematics ,General Mathematics ,Attractor ,Mathematics - Abstract
In this paper we focus on compacta$K \subseteq \mathbb {R}^3$which possess a neighbourhood basis that consists of nested solid tori$T_i$. We call these sets toroidal. Making use of the classical notion of the geometric index of a curve inside a torus, we introduce the self-geometric index of a toroidal setK, which roughly captures how each torus$T_{i+1}$winds inside the previous$T_i$as$i \rightarrow +\infty $. We then use this index to obtain some results about the realizability of toroidal sets as attractors for homeomorphisms of$\mathbb {R}^3$.
- Published
- 2021
49. Quasisymmetric orbit-flexibility of multicritical circle maps
- Author
-
Edson de Faria and Pablo Guarino
- Subjects
Pure mathematics ,Mathematics::Dynamical Systems ,Gauss map ,Lebesgue measure ,Primary 37E10, Secondary 37E20, 37C40 ,Applied Mathematics ,General Mathematics ,Diophantine equation ,Dynamical Systems (math.DS) ,Bounded type ,Homeomorphism ,FOS: Mathematics ,SISTEMAS DINÂMICOS ,Uncountable set ,Diffeomorphism ,Mathematics - Dynamical Systems ,Rotation number ,Mathematics - Abstract
Two given orbits of a minimal circle homeomorphism $f$ are said to be geometrically equivalent if there exists a quasisymmetric circle homeomorphism identifying both orbits and commuting with $f$. By a well-known theorem due to Herman and Yoccoz, if $f$ is a smooth diffeomorphism with Diophantine rotation number, then any two orbits are geometrically equivalent. As it follows from the a-priori bounds of Herman and Swiatek, the same holds if $f$ is a critical circle map with rotation number of bounded type. By contrast, we prove in the present paper that if $f$ is a critical circle map whose rotation number belongs to a certain full Lebesgue measure set in $(0,1)$, then the number of equivalence classes is uncountable (Theorem A). The proof of this result relies on the ergodicity of a two-dimensional skew product over the Gauss map. As a by-product of our techniques, we construct topological conjugacies between multicritical circle maps which are not quasisymmetric, and we show that this phenomenon is abundant, both from the topological and measure-theoretical viewpoints (Theorems B and C)., Comment: 38 pages, 5 figures. To appear in Ergodic Theory and Dynamical Systems
- Published
- 2021
50. Exponential mixing property for Hénon–Sibony maps of
- Author
-
Hao Wu
- Subjects
Property (philosophy) ,Applied Mathematics ,General Mathematics ,Mathematical analysis ,Mixing (physics) ,Exponential function ,Mathematics - Abstract
Let f be a Hénon–Sibony map, also known as a regular polynomial automorphism of $\mathbb {C}^k$ , and let $\mu $ be the equilibrium measure of f. In this paper we prove that $\mu $ is exponentially mixing for plurisubharmonic observables.
- Published
- 2021
Discovery Service for Jio Institute Digital Library
For full access to our library's resources, please sign in.