Your search keyword '"Hyperbolic set"' showing total 596 results

1. Dimension estimates and approximation in non-uniformly hyperbolic systems.

Author

WANG, JUAN, CAO, YONGLUO, and ZHAO, YUN

Abstract

Let $f: M\rightarrow M$ be a $C^{1+\alpha }$ diffeomorphism on an $m_0$ -dimensional compact smooth Riemannian manifold M and $\mu $ a hyperbolic ergodic f -invariant probability measure. This paper obtains an upper bound for the stable (unstable) pointwise dimension of $\mu $ , which is given by the unique solution of an equation involving the sub-additive measure-theoretic pressure. If $\mu $ is a Sinai–Ruelle–Bowen (SRB) measure, then the Kaplan–Yorke conjecture is true under some additional conditions and the Lyapunov dimension of $\mu $ can be approximated gradually by the Hausdorff dimension of a sequence of hyperbolic sets $\{\Lambda _n\}_{n\geq 1}$. The limit behaviour of the Carathéodory singular dimension of $\Lambda _n$ on the unstable manifold with respect to the super-additive singular valued potential is also studied. [ABSTRACT FROM AUTHOR]

Published

2024

2. Local Parameter Identifiability: Case of Discrete Infinite-Dimensional Parameter.

Author

Pilyugin, S. Yu. and Shalgin, V. S.

Abstract

In this paper, we study the problem of local parameter identifiability for discrete dynamical systems with discrete infinite-dimensional parameter. Our results are related to the so-called conditional local parameter identifiability. In this case, one introduces a special class P of possible perturbations of the selected parameter P 0 and finds conditions on observations of trajectories under which all parameters P ∈ P close to P 0 coincide with P 0 . We consider discrete dynamical systems for which the trajectories are observed at points k = 1 , 2 , ⋯ or at a countable set of points 0 < t 1 < t 2 < ⋯ . The case of a linearly perturbed diffeomorphism in a neighborhood of a hyperbolic set is also considered. [ABSTRACT FROM AUTHOR]

Published

2024

3. Nonexistence of energy function for surface diffeomorphisms with horseshoe basic sets

Author

M.K. Barinova and K.Y. Tirskaya

Subjects

Energy function, Smale horseshoe, Basic set, Ω-stability diffeomorphism, Hyperbolic set, Applied mathematics. Quantitative methods, T57-57.97

Abstract

The Lyapunov function is a powerful tool for studying dynamical systems. In particular, the existence of such a function for any dynamical system given on compact manifold, established by C. Conley, is the basis for proving the Ω-stability criterion of dynamical systems. Moreover, the Lyapunov function, whose set of critical points of aligns with the chain-recurrent set of the system, which called an energy function, qualitatively determines the dynamics of the system. For continuous-time systems, which models dissipative processes, such a function naturally arises as an energy of the system. The existence of an energy function for arbitrary flows on compact manifolds is known. Examples of Morse–Smale diffeomorphism without energy function exist on n-dimensional manifolds starting with n>2. For systems with chaotic dynamics on surfaces, the existence of energy functions has also been established in cases where the dimension of non-trivial basic sets is greater than or equal to 1. When the chain-recurrent set of a diffeomorphism contains at least one zero-dimensional non-trivial basic set, the question of the existence of the energy function is still open. To date, it is known that the answer is negative if the zero-dimensional non-trivial basic set does not contain pairs of conjugated points. The present paper is devoted to the question of existence of an energy function for systems having a basic set with pairs of conjugated points. The primary outcome of this study is that there is no energy function for a dynamical system containing a Smale horseshoe as a basic set.

Published

2024

4. Generalized hyperbolic sets on Banach spaces.

Author

Lee, K. and Rojas, A.

Subjects

*BANACH spaces, *INVARIANT sets

Abstract

We prove that every compact invariant set close to a generalized hyperbolic fixed point of a diffeomorphism of a Banach space is generalized hyperbolic. Therefore, infinite weakly transitive shifted-hyperbolic sets do exist in every neighborhood of a shifted-hyperbolic fixed point. [ABSTRACT FROM AUTHOR]

Published

2022

5. An upper bound for the box dimension of the hyperbolic dynamics via unstable topological pressure.

Author

Qu, Congcong

Abstract

In this paper, we utilize the sub-additive unstable topological pressure to give an upper bound for the upper box dimension of the C 1 hyperbolic set on local unstable manifold. As a by-product, we give a new expression of the topological pressure on symbolic spaces. This work is inspired by Barreira (1996), Feng and Simon (2023) and Zhang et al. (2022). [ABSTRACT FROM AUTHOR]

Published

2024

6. Does the hyperbolicity of periodic orbits of a geodesic flow without conjugate points imply the Anosov property?

Author

Ruggiero, Rafael O.

Subjects

*GEODESIC flows, *STRUCTURAL stability, *LYAPUNOV exponents, *GEODESICS

Abstract

Let (M,g) be a C∞ compact, connected, boundaryless manifold without conjugate points whose Green bundles are continuous. We show that if the closure of the set of periodic orbits of the geodesic flow is a hyperbolic set then the geodesic flow is Anosov. Combining this fact with recent results relating the structural stability of geodesic flows with the hyperbolicity of the closure of periodic orbits, we conclude that if the geodesic flow of (M,g) is C2-structurally stable from Mañé's viewpoint, then it is an Anosov flow, proving the so-called stability conjecture for the above class of compact manifolds without conjugate points. [ABSTRACT FROM AUTHOR]

Published

2021

7. On Local Topological Classification of Two-Dimensional Orientable, Non-Orientable, and Half-Orientable Horseshoes

Author

Gonchenko, S. V., Gonchenko, A. S., Malkin, M. I., Luo, Albert C.J., Series editor, Volchenkov, Dimitri, editor, and Leoncini, Xavier, editor

Published

2018

8. The approximation of uniform hyperbolicity for C1 diffeomorphisms with hyperbolic measures.

Author

Wang, Juan, Cao, Yongluo, and Zou, Rui

Subjects

*DIFFEOMORPHISMS, *LYAPUNOV exponents, *HORSESHOES, *ENTROPY

Abstract

Let f be a C 1 -diffeomorphism which preserves an ergodic hyperbolic measure μ with positive measure-theoretic entropy. Assume that the Oseledec splitting T x M = E 1 (x) ⊕ ⋯ ⊕ E s (x) ⊕ E s + 1 (x) ⊕ ⋯ ⊕ E l (x) is dominated on the Oseledec basin Γ. We give extensions of Katok's Horseshoes construction. Moreover there is a dominated splitting corresponding to Oseledec subspace on horseshoes. Based on this, we also establish the continuity of the sub-additive topological pressure of the singular value potential. [ABSTRACT FROM AUTHOR]

Published

2021

9. HYPERBOLIC SETS FOR THE FLOWS ON PSEUDO-RIEMANNIAN MANIFOLDS.

Author

Molaei, Mohammad Reza

Subjects

*MANIFOLDS (Mathematics), *RIEMANNIAN manifolds

Abstract

In this paper we introduce and consider the hyperbolic sets for the ows on pseudo-Riemannian manifolds. If is a hyperbolic set for a ow, then we show that at each point of we have a unique decomposition for its tangent space up to a distribution on the ambient pseudo-Riemannian manifold. We prove that we have such decomposition for many points arbitrarily close to a given member of. [ABSTRACT FROM AUTHOR]

Published

2020

10. Replication of Continuous Chaos About Equilibria

Author

Akhmet, Marat, Fen, Mehmet Onur, Luo, Albert C.J., Series editor, Ibragimov, Nail H., Series editor, Akhmet, Marat, and Fen, Mehmet Onur

Published

2016

11. Volume of Singular Hyperbolic Sets

Author

Dao Fei Zhang and Yun Tao Zang

Subjects

Set (abstract data type), Transitive relation, Pure mathematics, Dimension (vector space), Applied Mathematics, General Mathematics, Hyperbolic set, Vector field, Gravitational singularity, Riemannian manifold, Volume (compression), Mathematics

Abstract

Let X be a C1+ vector field on a compact Riemannian manifold M with dimension d ≥ 3. Let Λ be a transitive singular hypebolic set with positive volume. We show that Λ = M and Λ is a uniformly hyperbolic set without singularities.

Published

2021

12. Limits of sequences of pseudo-Anosov maps and of hyperbolic 3–manifolds

Author

Toby Hall, André de Carvalho, Juan González-Meneses, and Sylvain Bonnot

Subjects

Pure mathematics, Mathematics::Dynamical Systems, TEORIA DOS GRUPOS, Closure (topology), Geometric Topology (math.GT), Of the form, Type (model theory), Mathematics::Geometric Topology, Homeomorphism, Mathematics - Geometric Topology, Hyperbolic set, 57M50, 37E30, 57M25, 20F36, FOS: Mathematics, Braid, Geometry and Topology, Mathematics

Abstract

There are two objects naturally associated with a braid $\beta\in B_n$ of pseudo-Anosov type: a (relative) pseudo-Anosov homeomorphism $\varphi_\beta\colon S^2\to S^2$; and the finite volume complete hyperbolic structure on the 3-manifold $M_\beta$ obtained by excising the braid closure of $\beta$, together with its braid axis, from $S^3$. We show the disconnect between these objects, by exhibiting a family of braids $\{\beta_q:q\in{\mathbb{Q}}\cap(0,1/3]\}$ with the properties that: on the one hand, there is a fixed homeomorphism $\varphi_0\colon S^2\to S^2$ to which the (suitably normalized) homeomorphisms $\varphi_{\beta_{q}}$ converge as $q\to 0$; while on the other hand, there are infinitely many distinct hyperbolic 3-manifolds which arise as geometric limits of the form $\lim_{k\to\infty} M_{\beta_{q_k}}$, for sequences $q_k\to 0$., Comment: Author accepted manuscript

Published

2021

13. Entropy theory for sectional hyperbolic flows

Author

Jiagang Yang, Maria José Pacifico, and Fan Yang

Subjects

Lyapunov function, Pure mathematics, Mathematics::Dynamical Systems, Applied Mathematics, 010102 general mathematics, Topological entropy, 01 natural sciences, symbols.namesake, Positive entropy, Corollary, Hyperbolic set, 0103 physical sciences, Attractor, symbols, Periodic orbits, Entropy (information theory), 010307 mathematical physics, 0101 mathematics, Mathematical Physics, Analysis, Mathematics

Abstract

We use entropy theory as a new tool to study sectional hyperbolic flows in any dimension. We show that for C 1 flows, every sectional hyperbolic set Λ is entropy expansive, and the topological entropy varies continuously with the flow. Furthermore, if Λ is Lyapunov stable, then it has positive entropy; in addition, if Λ is a chain recurrent class, then it contains a periodic orbit. As a corollary, we prove that for C 1 generic flows, every Lorenz-like class is an attractor.

Published

2021

14. Does the hyperbolicity of periodic orbits of a geodesic flow without conjugate points imply the Anosov property?

Author

Rafael O. Ruggiero

Subjects

symbols.namesake, Property (philosophy), Applied Mathematics, General Mathematics, Hyperbolic set, Mathematical analysis, Conjugate points, symbols, Geodesic flow, Periodic orbits, Lyapunov exponent, Mathematics

Published

2021

15. Shapes of hyperbolic triangles and once-punctured torus groups

Author

Ser Peow Tan, Ken'ichi Ohshika, Xinghua Gao, Sang-hyun Kim, Thomas Koberda, and Jaejeong Lee

Subjects

Dense set, Group (mathematics), General Mathematics, Image (category theory), 010102 general mathematics, Holonomy, Geometric Topology (math.GT), Torus, Group Theory (math.GR), Space (mathematics), 01 natural sciences, Combinatorics, Mathematics - Geometric Topology, Hyperbolic set, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, 0101 mathematics, Mathematics - Group Theory, Hyperbolic triangle, Mathematics

Abstract

Let $\Delta$ be a hyperbolic triangle with a fixed area $\varphi$. We prove that for all but countably many $\varphi$, generic choices of $\Delta$ have the property that the group generated by the $\pi$--rotations about the midpoints of the sides of the triangle admits no nontrivial relations. By contrast, we show for all $\varphi\in(0,\pi)\setminus\mathbb{Q}\pi$, a dense set of triangles does afford nontrivial relations, which in the generic case map to hyperbolic translations. To establish this fact, we study the deformation space $\mathfrak{C}_\theta$ of singular hyperbolic metrics on a torus with a single cone point of angle $\theta=2(\pi-\varphi)$, and answer an analogous question for the holonomy map $\rho_\xi$ of such a hyperbolic structure $\xi$. In an appendix by X.~Gao, concrete examples of $\theta$ and $\xi\in\mathfrak{C}_\theta$ are given where the image of each $\rho_\xi$ is finitely presented, non-free and torsion-free; in fact, those images will be isomorphic to the fundamental groups of closed hyperbolic 3--manifolds., Comment: 32 pages. To appear in Math. Z

Published

2021

16. Asymptotic phase for flows with exponentially stable partially hyperbolic invariant manifolds

Author

Igor Parasyuk and Alina Luchko

Subjects

Tangent bundle, Pure mathematics, exponential stability, Applied Mathematics, Invariant manifold, Motion (geometry), Foliation, partially hyperbolic dynamical system, Normal bundle, Exponential stability, Hyperbolic set, asymptotic phase, QA1-939, invariant manifold, Invariant (mathematics), Mathematics

Abstract

We consider an autonomous system admitting an invariant manifold $\mathcal{M}$. The following questions are discussed: (i) what are the conditions ensuring exponential stability of the invariant manifold? (ii) does every motion attracting by $\mathcal{M}$ tend to some motion on $\mathcal{M}$ (i.e. have an asymptotic phase)? (iii) what is the geometrical structure of the set formed by orbits approaching a given orbit? We get an answer to (i) in terms of Lyapunov functions omitting the assumption that the normal bundle of $\mathcal{M}$ is trivial. An affirmative answer to (ii) is obtained for invariant manifold $\mathcal{M}$ with partially hyperbolic structure of tangent bundle. In this case, the existence of asymptotic phase is obtained under new conditions involving contraction rates of the linearized flow in normal and tangential to $\mathcal{M}$ directions. To answer the question (iii), we show that a neighborhood of $\mathcal{M}$ has a structure of invariant foliation each leaf of which corresponds to motions with common asymptotic phase. In contrast to theory of cascades, our technique exploits the classical Lyapunov–Perron method of integral equations.

Published

2021

17. Volume rigidity ad ideal points of the character variety of hyperbolic 3-manifolds

Author

Stefano Francaviglia, Alessio Savini, Stefano Francaviglia, and Alessio Savini

Subjects

Mathematics - Differential Geometry, Ideal point, Fundamental group, 010102 general mathematics, Holonomy, Geometric Topology (math.GT), 57M50, 53C24, 22E40, 01 natural sciences, Character variety, Hyperbolic volume, Theoretical Computer Science, Combinatorics, Mathematics - Geometric Topology, Mathematics (miscellaneous), Rigidity (electromagnetism), Differential Geometry (math.DG), Hyperbolic set, Bounded function, 0103 physical sciences, FOS: Mathematics, Volume of representations, rigidity, character varity, 010307 mathematical physics, Representations, hyperbolic volume, rigidity, 0101 mathematics, Mathematics

Abstract

Given the fundamental group $\Gamma$ of a finite-volume complete hyperbolic $3$-manifold $M$, it is possible to associate to any representation $\rho:\Gamma \rightarrow \text{Isom}(\mathbb{H}^3)$ a numerical invariant called volume. This invariant is bounded by the hyperbolic volume of $M$ and satisfies a rigidity condition: if the volume of $\rho$ is maximal, then $\rho$ must be conjugated to the holonomy of the hyperbolic structure of $M$. This paper generalizes this rigidity result by showing that if a sequence of representations of $\Gamma$ into $\text{Isom}(\mathbb{H}^3)$ satisfies $\lim_{n \to \infty} \text{Vol}(\rho_n) = \text{Vol}(M)$, then there must exist a sequence of elements $g_n \in \text{Isom}(\mathbb{H}^3)$ such that the representations $g_n \circ \rho_n \circ g_n^{-1}$ converge to the holonomy of $M$. In particular if the sequence $\rho_n$ converges to an ideal point of the character variety, then the sequence of volumes must stay away from the maximum. We conclude by generalizing the result to the case of $k$-manifolds and representations in $\text{Isom}(\mathbb H^m)$, where $m\geq k$., Comment: 21 pages

Published

2020

18. The Smale horseshoes in a class of non-invertible maps in with two-direction instability.

Author

Zhang, Xu

Subjects

*EUCLIDEAN distance, *HYPERBOLIC functions

Abstract

We study the existence of Smale horseshoes of new type and the uniformly hyperbolic invariant sets for a class of non-invertible maps in three-dimensional Euclidean spaces with the dimension of instability equal to two. Parameter regions are given, for which the map has a horseshoe and a uniformly hyperbolic invariant set on which the map is topologically conjugate to the two-sided fullshift on four symbols. [ABSTRACT FROM PUBLISHER]

Published

2017

19. Chaos in Traveling Waves of Lattice Systems of Unbounded Media

Author

Orendovici, D. R., Pesin, Ya B., Miller, Willard, Jr., editor, Doedel, Eusebius, editor, and Tuckerman, Laurette S., editor

Published

2000

20. Adapted Metrics for Singular Hyperbolic Flows

Author

Vitor Araujo, Luciana Salgado, and Vinícius Almeida Coelho

Subjects

Pure mathematics, Mathematics::Dynamical Systems, General Mathematics, Hyperbolic set, FOS: Mathematics, 37D30 (Primary), 37D25, 58B20 (Secondary), Vector field, Gravitational singularity, Dynamical Systems (math.DS), Mathematics - Dynamical Systems, Invariant (mathematics), Mathematics::Geometric Topology, Mathematics

Abstract

Singular and sectional hyperbolic sets are the objects of the extension of the classical Smale Hyperbolic Theory to flows having invariant sets with singularities accumulated by regular orbits within the set. It is by now well-known that (partially) hyperbolic sets admit adapted metrics. We show the existence of singular adapted metrics for any singular hyperbolic set with respect to a $C^{1}$ vector field on finite dimensional compact manifolds. Moreover, we obtain 2-sectional adapted metrics for certain open classes of 2-sectional hyperbolic sets and also for any hyperbolic set., Comment: 23 pages, 1 figure. Improved the statements of the results and corrected the proof of the main theorem. To appear in Bull. Brazilian Mathematical Society

Published

2020

21. Surjectivity of certain adjoint operators and applications

Author

Amina Cherifi Hadjiat and Azzeddine Lansari

Subjects

T57-57.97, Applied mathematics. Quantitative methods, General Mathematics, Fundamental lemma, Epimorphism, Combinatorics, 53C05, Hyperbolic set, Lie algebra, QA1-939, Symmetric matrix, Diffeomorphism, Infinitesimal generator, Eigenvalues and eigenvectors, Mathematics

Abstract

This paper is an extension and generalization of some previous works, such as the study of M. Benalili and A. Lansari. Indeed, these authors, in their work about the finite co-dimension ideals of Lie algebras of vector fields, restricted their study to fields $$X_0$$ X 0 of the form $$X_0=\sum _{i=1}^{n}( \alpha _i \cdot x_i+\beta _i\cdot x_i^{1+m_i}) \frac{\partial }{\partial x_i}$$ X 0 = ∑ i = 1 n ( α i · x i + β i · x i 1 + m i ) ∂ ∂ x i , where $$\alpha _i, \beta _i $$ α i , β i are positive and $$m_i$$ m i are even natural integers. We will first study the sub-algebra U of the Lie-Fréchet space E, containing vector fields of the form $$Y_0 = X_0^+ + X_0^- + Z_0$$ Y 0 = X 0 + + X 0 - + Z 0 , such as $$ X_0\left( x,y\right) =A\left( x,y\right) =\left( A^{-}\left( x \right) ,A^{+}\left( y\right) \right) $$ X 0 x , y = A x , y = A - x , A + y , with $$A^-$$ A - (respectively, $$ A^+ $$ A + ) a symmetric matrix having eigenvalues $$ \lambda < 0$$ λ < 0 (respectively, $$\lambda >0 $$ λ > 0 ) and $$Z_0$$ Z 0 are germs infinitely flat at the origin. This sub-algebra admits a hyperbolic structure for the diffeomorphism $$\psi _{t*}=(exp\cdot tY_0)_*$$ ψ t ∗ = ( e x p · t Y 0 ) ∗ . In a second step, we will show that the infinitesimal generator $$ad_{-X}$$ a d - X is an epimorphism of this admissible Lie sub-algebra U. We then deduce, by our fundamental lemma, that $$U=E$$ U = E .

Published

2020

22. On Some Sufficient Hyperbolicity Conditions

Author

N. Kh. Rozov, A. Yu. Kolesov, and Sergey Dmitrievich Glyzin

Subjects

Pure mathematics, Mathematics (miscellaneous), Dimension (vector space), Hyperbolic set, Diffeomorphism, Riemannian manifold, Mathematics

Abstract

—We consider an arbitrary C1 diffeomorphism f that acts from an open subset U of a Riemannian manifold M of dimension m, m ≥ 2, to f(U) ⊂ M. Let A be a compact f-invariant (i.e., f(A) = A) subset in U. We propose various sufficient conditions under which A is a hyperbolic set of f.

Published

2020

23. How to identify a hyperbolic set as a blender

Author

Bernd Krauskopf, Stefanie Hittmeyer, Hinke M. Osinga, and Katsutoshi Shinohara

Subjects

Pure mathematics, Mathematics::Dynamical Systems, Plane (geometry), Applied Mathematics, Invariant manifold, Mathematics::Geometric Topology, Manifold, Set (abstract data type), Range (mathematics), Computer Science::Graphics, Intersection, Hyperbolic set, Discrete Mathematics and Combinatorics, Diffeomorphism, Mathematics::Symplectic Geometry, Analysis, Mathematics

Abstract

A blender is a hyperbolic set with a stable or unstable invariant manifold that behaves as a geometric object of a dimension larger than that of the respective manifold itself. Blenders have been constructed in diffeomorphisms with a phase space of dimension at least three. We consider here the question of how one can identify, characterize and also visualize the underlying hyperbolic set of a given diffeomorphism to verify whether it actually is a blender or not. More specifically, we employ advanced numerical techniques for the computation of global manifolds to identify the hyperbolic set and its stable and unstable manifolds in an explicit Henon-like family of three-dimensional diffeomorphisms. This allows to determine and illustrate whether the hyperbolic set is a blender; in particular, we consider as a distinguishing feature the self-similar structure of the intersection set of the respective global invariant manifold with a plane. By checking and illustrating a denseness property, we are able to identify a parameter range over which the hyperbolic set is a blender, and we discuss and illustrate how the blender disappears.

Published

2020

24. Formal Methods for Computing Hyperbolic Invariant Sets for Nonlinear Systems

Author

Guillaume O. Berger, Raphaël M. Jungers, and UCL - SST/ICTM/INMA - Pôle en ingénierie mathématique

Subjects

Path-complete Lyapunov techniques, Bisimulation, 0209 industrial biotechnology, Pure mathematics, Mathematics::Dynamical Systems, Control and Optimization, Dynamical systems theory, Computer science, 010102 general mathematics, Ergodicity, Linear matrix inequalities, MathematicsofComputing_NUMERICALANALYSIS, Ikeda map, 02 engineering and technology, Invariant (physics), 01 natural sciences, Nonlinear system, 020901 industrial engineering & automation, Control and Systems Engineering, Abstraction/symbolic image, Hyperbolic set, Hybrid system, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, 0101 mathematics, Hyperbolic dynamics

Abstract

Hyperbolicity is a cornerstone of nonlinear dynamical systems theory. Hyperbolic dynamics are characterized by the presence of expanding and contracting directions for the derivative along the trajectories of the system. Hyperbolic dynamical systems enjoy many interesting properties like structural stability, ergodicity, transitivity, etc. In this letter, we describe a hybrid systems framework to compute invariant sets with a hyperbolic structure for a given dynamical system. The method relies on an abstraction (also known as symbolic image or bisimulation) of the state space of the system, and on path-complete ``Lyapunov-like'' techniques to compute the expanding and contracting directions for the derivative along the trajectories of the system. The method is illustrated on a numerical example: the Ikeda map for which an invariant set with hyperbolic structure is computed using the framework

Published

2020

25. The relative hyperbolicity and manifold structure of certain right-angled Coxeter groups

Author

Hoang Thanh Nguyen, Hung Cong Tran, and Matthew Haulmark

Subjects

Pure mathematics, General Mathematics, 010102 general mathematics, Coxeter group, 01 natural sciences, Mathematics::Group Theory, Planar, Manifold structure, Hyperbolic set, 0103 physical sciences, Mathematics::Metric Geometry, 010307 mathematical physics, 0101 mathematics, Mathematics

Abstract

In this paper, we study the manifold structure and the relative hyperbolic structure of right-angled Coxeter groups with planar nerves. We then apply our results to the quasi-isometry problem for this class of right-angled Coxeter groups.

Published

2019

26. On the asymptotic expansion of the quantum SU(2) invariant at q =exp(4π∕N) for closed hyperbolic 3–manifolds obtained by integral surgery along the figure-eight knot

Author

Tomotada Ohtsuki

Subjects

medicine.medical_specialty, Quantum invariant, Hyperbolic geometry, 010102 general mathematics, Volume conjecture, Figure-eight knot, Mathematics::Geometric Topology, 01 natural sciences, Manifold, Surgery, Hyperbolic set, 0103 physical sciences, medicine, 010307 mathematical physics, Geometry and Topology, 0101 mathematics, Invariant (mathematics), 3-manifold, Mathematics

Abstract

It is known that the quantum SU ( 2 ) invariant of a closed 3 –manifold at q = exp ( 2 π − 1 ∕ N ) is of polynomial order as N → ∞ . Recently, Chen and Yang conjectured that the quantum SU ( 2 ) invariant of a closed hyperbolic 3 –manifold at q = exp ( 4 π − 1 ∕ N ) is of order exp ( N ⋅ ς ( M ) ) , where ς ( M ) is a normalized complex volume of M . We can regard this conjecture as a kind of “volume conjecture”, which is an important topic from the viewpoint that it relates quantum topology and hyperbolic geometry. In this paper, we give a concrete presentation of the asymptotic expansion of the quantum SU ( 2 ) invariant at q = exp ( 4 π − 1 ∕ N ) for closed hyperbolic 3 –manifolds obtained from the 3 –sphere by integral surgery along the figure-eight knot. In particular, the leading term of the expansion is exp ( N ⋅ ς ( M ) ) , which gives a proof of the Chen–Yang conjecture for such 3 –manifolds. Further, the semiclassical part of the expansion is a constant multiple of the square root of the Reidemeister torsion for such 3 –manifolds. We expect that the higher-order coefficients of the expansion would be “new” invariants, which are related to “quantization” of the hyperbolic structure of a closed hyperbolic 3 –manifold.

Published

2018

27. A Hyperbolic-to-Hyperbolic Graph Convolutional Network

Author

Jindou Dai, Yunde Jia, Yuwei Wu, and Zhi Gao

Subjects

FOS: Computer and information sciences, Pure mathematics, Computer Science - Machine Learning, Mathematics::Dynamical Systems, Computer science, business.industry, Hyperbolic manifold, Link (geometry), Mathematics::Geometric Topology, Manifold, Machine Learning (cs.LG), Convolution, Transformation (function), Hyperbolic set, Tangent space, Artificial intelligence, Representation (mathematics), business

Abstract

Hyperbolic graph convolutional networks (GCNs) demonstrate powerful representation ability to model graphs with hierarchical structure. Existing hyperbolic GCNs resort to tangent spaces to realize graph convolution on hyperbolic manifolds, which is inferior because tangent space is only a local approximation of a manifold. In this paper, we propose a hyperbolic-to-hyperbolic graph convolutional network (H2H-GCN) that directly works on hyperbolic manifolds. Specifically, we developed a manifold-preserving graph convolution that consists of a hyperbolic feature transformation and a hyperbolic neighborhood aggregation. The hyperbolic feature transformation works as linear transformation on hyperbolic manifolds. It ensures the transformed node representations still lie on the hyperbolic manifold by imposing the orthogonal constraint on the transformation sub-matrix. The hyperbolic neighborhood aggregation updates each node representation via the Einstein midpoint. The H2H-GCN avoids the distortion caused by tangent space approximations and keeps the global hyperbolic structure. Extensive experiments show that the H2H-GCN achieves substantial improvements on the link prediction, node classification, and graph classification tasks., CVPR2021, Oral

Published

2021

28. Star fows and multisingular hyperbolicity

Author

Christian Bonatti, Adriana da Luz, Institut de Mathématiques de Bourgogne [Dijon] (IMB), Centre National de la Recherche Scientifique (CNRS)-Université de Franche-Comté (UFC), Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université de Bourgogne (UB), Peking University [Beijing], and Ecole doctorale Carnot PasteurANII FCECAP UdelaRCentro de Matematicas UdelaR

Subjects

Pure mathematics, Mathematics::Dynamical Systems, Dense set, Applied Mathematics, General Mathematics, 010102 general mathematics, [MATH.MATH-DS]Mathematics [math]/Dynamical Systems [math.DS], Dynamical Systems (math.DS), Star (graph theory), Singular hyperbolicity, 01 natural sciences, Mathematics::Geometric Topology, 4-manifold, dominated splitting, Compact space, Flow (mathematics), Hyperbolic set, FOS: Mathematics, Gravitational singularity, Vector field, Mathematics - Dynamical Systems, 0101 mathematics, linear Poincare flow, Mathematics, star flows

Abstract

A vector field X is called a star flow if every periodic orbit, of any vector field C1-close to X, is hyperbolic. It is known that the chain recurrence classes of a generic star flow X on a 3 or 4 manifold are either hyperbolic or singular hyperbolic (see [MPP] for 3-manifolds and [GLW] on 4-manifolds). As it is defined, the notion of singular hyperbolicity forces the singularities in the same class to have the same index. However, in higher dimension (i.e $\geq 5$) \cite{BdL} shows that singularities of different indices may be robustly in the same chain recurrence class of a star flow. Therefore the usual notion of singular hyperbolicity is not enough for characterizing the star flows. We present a form of hyperbolicity (called multi-singular hyperbolic) which makes compatible the hyperbolic structure of regular orbits together with the one of singularities even if they have different indices. We show that multisingular hyperbolicity implies that the flow is star, and conversely, there is a C1-open and dense subset of the an open set of star flows which are multisingular hyperbolic. More generally, for most of the hyperbolic structures (dominated splitting, partial hyperbolicity etc...) well defined on regular orbits, we propose a way for generalizing it to a compact set containing singular points., There are new results in section 7 compared with the previous version

Published

2021

29. Convex plumbings in closed hyperbolic 4-manifolds

Author

Leone Slavich, Bruno Martelli, Stefano Riolo, Martelli B., Riolo S., and Slavich L.

Subjects

Pure mathematics, Mathematics::Dynamical Systems, Hyperbolic geometry, Hyperbolic 4-manifold, Intersection form, Plumbing, Algebraic geometry, 01 natural sciences, Mathematics - Geometric Topology, Simple (abstract algebra), Hyperbolic set, 0103 physical sciences, FOS: Mathematics, 0101 mathematics, Mathematics::Symplectic Geometry, Mathematics, Original Paper, 010102 general mathematics, Regular polygon, Geometric Topology (math.GT), Submanifold, Mathematics::Geometric Topology, 57M50, Differential geometry, 010307 mathematical physics, Geometry and Topology, Mathematics::Differential Geometry

Abstract

We show that every plumbing of disc bundles over surfaces whose genera satisfy a simple inequality may be embedded as a convex submanifold in some closed hyperbolic four-manifold. In particular its interior has a geometrically finite hyperbolic structure that covers a closed hyperbolic four-manifold., 18 pages, 11 figures

Published

2021

30. Dynamical properties of the Molniya satellite constellation: long-term evolution of the semi-major axis

Author

Anne Lemaitre, Elisa Maria Alessi, Joseph O’Leary, Alberto Buzzoni, and Jérôme Daquin

Subjects

Lyapunov function, Integrable system, Dynamical systems theory, hyperbolic manifolds, Fast Lyapunov Indicator, Satellite constellation, Aerospace Engineering, FOS: Physical sciences, Ocean Engineering, Space (mathematics), Molniya orbit, Lunisolar resonance, symbols.namesake, Hyperbolic set, Statistical physics, Electrical and Electronic Engineering, Physics, Earth and Planetary Astrophysics (astro-ph.EP), Space Situational Awareness, Applied Mathematics, Mechanical Engineering, Geosynchronous orbit, Tesseral resonance, Nonlinear Sciences - Chaotic Dynamics, Control and Systems Engineering, Phase space, symbols, Chaotic Dynamics (nlin.CD), Astrophysics - Earth and Planetary Astrophysics

Abstract

We describe the phase space structures related to the semi-major axis of Molniya-like satellites subject to tesseral and lunisolar resonances. In particular, the questions answered in this contribution are: (i) we study the indirect interplay of the critical inclination resonance on the semi-geosynchronous resonance using a hierarchy of more realistic dynamical systems, thus discussing the dynamics beyond the integrable approximation. By introducing ad hoc tractable models averaged over fast angles, (ii) we numerically demarcate the hyperbolic structures organising the long-term dynamics via Fast Lyapunov Indicators cartography. Based on the publicly available two-line elements space orbital data, (iii) we identify two satellites, namely Molniya 1-69 and Molniya 1-87, displaying fingerprints consistent with the dynamics associated to the hyperbolic set. Finally, (iv) the computations of their associated dynamical maps highlight that the spacecraft are trapped within the hyperbolic tangle. This research therefore reports evidence of actual artificial satellites in the near-Earth environment whose dynamics are ruled by manifolds and resonant mechanisms. The tools, formalism and methodologies we present are exportable to other region of space subject to similar commensurabilities as the geosynchronous region., Comment: 26 pages, 9 figures. Comments and feedback appreciated

Published

2021

31. Multimodal sentiment and emotion recognition in hyperbolic space

Author

Carlo Vercellis, Carlotta Orsenigo, Keith April Araño, and Mauricio Soto

Subjects

Mmultimodal machine learning, Theoretical computer science, Artificial neural network, Computer science, Hyperbolic space, General Engineering, Deep learning, Complex network, Computer Science Applications, Data mapping, Hybrid neural network, Sentiment analysis, Artificial Intelligence, Hyperbolic set, Metric (mathematics), Euclidean geometry, Hyperbolic learning, Emotion recognition

Abstract

Prior approaches for multimodal sentiment and emotion recognition (SER) exploit input data representations and neural networks based on the classical Euclidean geometry. Recently, however, the hyperbolic metric proved to be a powerful tool for data mapping, being able to capture the hierarchical structure of the relations among elements in the data. In this paper we propose the use of hyperbolic learning for SER, and show that the inclusion in the neural network of hyperbolic structures mapping the input into the hyperbolic space can improve the quality of the predictions. The benefits brought by the hyperbolic features are evaluated by developing extensions of existing methods following two approaches. From one side, we modified state-of-the-art models by including hyperbolic output layers. From the other, we generated hybrid neural network architectures by combining hyperbolic and Euclidean layers according to different schemes. The proposed hyperbolic models were tested on several classification tasks applied to benchmark multimodal SER datasets. Experiments gave strong evidence that in both simple and complex networks the introduction of a hyperbolic structure results in an improvement of the model accuracy. Specifically, the combined use of hyperbolic and Euclidean layers showed superior performance in almost all the classification tasks.

Published

2021

32. Transmit digital multi-beam forming based on hyperbolic fractional delay filter

Author

Yan Han, Fu Mingxing, Ding Xiaowei, and Aoyu He

Subjects

Reliability theory, Computer science, Control theory, Hyperbolic set, Hyperbolic function, Fractional delay filter, Multi beam, Effective time, Infinite product, Compensation (engineering)

Abstract

In this paper, a transmit digital multi-beam forming method based on hyperbolic fractional delay filter is presented, which provides effective time delay compensation and can reduce the consumption of hardware resources. In the proposed method,firstly, the hyperbolic function is expanded in the way of infinite product, and only two sub-filters are included in the expansion. Then, the hyperbolic fractional delay filter is obtained by using the solved sub-filter, so as to realize the clock fractional delay compensation. Then, the transmit digital multibeam forming is realized by using the designed fractional delay filter based on hyperbolic structure. Finally, the feasibility and effectiveness of the proposed design method are verified by experimental simulation.

Published

2020

33. Scientific heritage of L.P. Shilnikov.

Author

Afraimovich, Valentin, Gonchenko, Sergey, Lerman, Lev, Shilnikov, Andrey, and Turaev, Dmitry

Abstract

This is the first part of a review of the scientific works of L.P. Shilnikov. We group his papers according to 7 major research topics: bifurcations of homoclinic loops; the loop of a saddle-focus and spiral chaos; Poincare homoclinics to periodic orbits and invariant tori, homoclinic in noautonous and infinite-dimensional systems; Homoclinic tangency; Saddlenode bifurcation - quasiperiodicity-to-chaos transition, blue-sky catastrophe; Lorenz attractor; Hamiltonian dynamics. The first two topics are covered in this part. The review will be continued in the further issues of the journal. [ABSTRACT FROM AUTHOR]

Published

2014

34. Topics in Delay Differential Equations.

Author

Walther, Hans-Otto

Abstract

We introduce delay differential equations, give some motivation by applications, review basic facts about initial value problems from wellposedness to the variation-of-constants formula in the sun-star-framework, and discuss two topics in greater detail: (a) The dynamics generated by autonomous scalar equations with a single, constant time lag, from existence of periodic solutions to the fine structure of global attractors and chaotic motion, and (b) more recent results on equations with state-dependent delay (lack of smoothness, differentiable solution operators on suitable Banach manifolds, case studies). The final part addresses directions of future research. [ABSTRACT FROM AUTHOR]

Published

2014

35. Free space super focusing using all dielectric hyperbolic metamaterial

Author

Norhan Salama, Mai Desouky, Mohamed A. Swillam, and Salah S. A. Obayya

Subjects

lcsh:Medicine, Physics::Optics, Position and momentum space, Near and far field, 02 engineering and technology, Dielectric, 01 natural sciences, Article, law.invention, 010309 optics, Optics, Negative refraction, Nanoscience and technology, law, Hyperbolic set, 0103 physical sciences, lcsh:Science, Physics, Nanoscale materials, Multidisciplinary, business.industry, lcsh:R, Metamaterial, 021001 nanoscience & nanotechnology, Lens (optics), Metamaterials, lcsh:Q, 0210 nano-technology, business, Realization (systems)

Abstract

Despite that Hyperbolic Metamaterial (HMM) has demonstrated sub-wavelength focusing inside of it, sub-wavelength imaging in free space of HMM is rarely introduced. The decay of hyperbolic momentum space outside the hyperbolic medium has hindered the realization of sub-wavelengh focusing in the near field of HMM. Furthermore, manipulating the negatively refracted waves exiting the HMM have addressed another major obstacle to realize free space sub-wavelength focusing. In this work, we report extended sub-wavelength focusing in free space based on negative refraction of light exiting the HMM. The proposed structure is composed of multilayers of doped InAs/intrinsic InAs integrated with metallic slit. We theoretically simulate the doped InAs/intrinsic InAs HMM and investigate the negative refraction behavior outside the HMM. We optimized the structure for achieving high resolution down to 0.2λ, extended to a distance of 3.2 µm in free space. Also, sub-wavelength focusing in free space has been studied at different doping concentrations showing that the small doping concentrations exhibit enhancement in resolution at short distances up to 600 nm away from the HMM. Extending the focusing distance is achieved up to distance 3.5 µm from the hyperbolic structure by manipulating the doping concentration. This proposed lens configuration is expected to find potential usage in mid IR thermal imaging and photolithography application.

Published

2020

36. Hyperbolic geometry of gene expression

Author

Yuansheng Zhou and Tatyana O. Sharpee

Subjects

0301 basic medicine, Pure mathematics, Current (mathematics), media_common.quotation_subject, Cellular differentiation, Hyperbolic geometry, Value (computer science), 02 engineering and technology, Curvature, Article, 03 medical and health sciences, Hyperbolic set, Euclidean geometry, lcsh:Science, Gene, media_common, Mathematics, Multidisciplinary, Variables, Representation (systemics), Complex Systems, Cell Biology, 021001 nanoscience & nanotechnology, Visualization, Euclidean distance, 030104 developmental biology, Genes, Metric (mathematics), lcsh:Q, 0210 nano-technology, Biological system, Curse of dimensionality

Abstract

Summary Patterns of gene expressions play a key role in determining cell state. Although correlations in gene expressions have been well documented, most of the current methods treat them as independent variables. One way to take into account gene correlations is to find a low-dimensional curved geometry that describes variation in the data. Here we develop such a method and find that gene expression across multiple cell types exhibits a low-dimensional hyperbolic structure. When more genes are taken into account, hyperbolic effects become stronger but representation remains low dimensional. The size of the hyperbolic map, which indicates the hierarchical depth of the data, was the largest for human cells, the smallest for mouse embryonic cells, and intermediate in differentiated cells from different mouse organs. We also describe how hyperbolic metric can be incorporated into the t-SNE method to improve visualizations compared with leading methods., Graphical abstract, Highlights • A method to identify underlying low-dimensional geometry in high-dimensional dataset • Gene expression data exhibit local Euclidean and large-scale hyperbolic geometry • The size of the hyperbolic map is larger in differentiated and brain cells • Taking into account hyperbolic geometry yields improved visualization of data, Genes; Cell Biology; Complex Systems

Published

2020

37. No-shadowing for singular hyperbolic sets with a singularity

Author

Lan Wen and Xiao Wen

Subjects

Pure mathematics, Property (philosophy), Applied Mathematics, Dynamical Systems (math.DS), Transitive set, 01 natural sciences, Mathematics::Geometric Topology, 010101 applied mathematics, Set (abstract data type), Singularity, Chain (algebraic topology), Flow (mathematics), Hyperbolic set, FOS: Mathematics, Discrete Mathematics and Combinatorics, 0101 mathematics, Mathematics - Dynamical Systems, Analysis, Axiom A, Mathematics

Abstract

We prove that every singular hyperbolic chain transitive set with a singularity does not admit the shadowing property. Using this result we show that if a star flow has the shadowing property on its chain recurrent set then it satisfies Axiom A and the no-cycle conditions; and that if a multisingular hyperbolic set has the shadowing property then it is hyperbolic.

Published

2020

38. Hyperbolicity through stable shadowing for generic geodesic flows

Author

Maria Joana Torres, Mário Bessa, João Lopes Dias, and Universidade do Minho

Subjects

Pure mathematics, Hyperbolic sets, Property (philosophy), Science & Technology, Geodesic, Closure (topology), Statistical and Nonlinear Physics, Shadowing, 16. Peace & justice, Condensed Matter Physics, 01 natural sciences, Manifold, 010305 fluids & plasmas, Bounded function, Hyperbolic set, 0103 physical sciences, Metric (mathematics), Geodesic flow, Mathematics::Differential Geometry, 010306 general physics, Specification, Mathematics, Matemáticas [Ciências Naturais], Ciências Naturais::Matemáticas

Abstract

We prove that the closure of the closed orbits of a generic geodesic flow on a closed Riemannian n >= 2 dimensional manifold is a uniformly hyperbolic set if the shadowing property holds C2-robustly on the metric. We obtain analogous results using weak specification and the shadowing property allowing bounded time reparametrization., The authors were partially supported by the Project ‘New trends in Lyapunov exponents’ (PTDC/MAT-PUR/29126/2017). MB was partially supported by FCT - ‘Fundação para a Ciência e a Tecnologia’, through Centro de Matemática e Aplicações (CMA-UBI), Universidade da Beira Interior, project UID/MAT/00212/2013. JLD was partially supported by the Project CEMAPRE - UID/MULTI/00491/2019 financed by FCT/MCTES through national funds. MJT was partially supported by the Research Centre of Mathematics of the University of Minho with the Portuguese Funds from the Fundação para a Ciência e a Tecnologia, through the Project UID/MAT/00013/2013.

Published

2020

39. Radiation outcoupling efficiency from hyperbolic metamaterial resonators of various shapes

Author

Andrey Bogdanov and Ilya Deriy

Subjects

Physics, Imagination, business.industry, media_common.quotation_subject, Physics::Optics, Metamaterial, Radiation, Purcell effect, Radiation pattern, Resonator, Dipole, Optics, Hyperbolic set, business, media_common

Abstract

In our work we study the dipole placed in homogenized hyperbolic media surrounding by air. We investigate the enhancement of outcoupled radiation due to the mutual orientation of a dipole and a hyperbolic metamaterial face. We analyze the radiation pattern of different shapes of the hyperbolic structure in order to find the optimum geometrical parameters. These results lead to the efficient emission control and Purcell effect implementation.

Published

2020

40. Geometry of biperiodic alternating links

Author

Jessica S. Purcell, Abhijit Champanerkar, and Ilya Kofman

Subjects

Pure mathematics, 57M27, 57M50, 57M25, 010308 nuclear & particles physics, General Mathematics, 010102 general mathematics, Triangulation (social science), Geometric Topology (math.GT), Torus, 01 natural sciences, Mathematics - Geometric Topology, Unimodular matrix, Hyperbolic set, 0103 physical sciences, Euclidean geometry, FOS: Mathematics, 0101 mathematics, Invariant (mathematics), Link (knot theory), Quotient, Mathematics

Abstract

A biperiodic alternating link has an alternating quotient link in the thickened torus. In this paper, we focus on semi-regular links, a class of biperiodic alternating links whose hyperbolic structure can be immediately determined from a corresponding Euclidean tiling. Consequently, we determine the exact volumes of semi-regular links. We relate their commensurability and arithmeticity to the corresponding tiling, and assuming a conjecture of Milnor, we show there exist infinitely many pairwise incommensurable semi-regular links with the same invariant trace field. We show that only two semi-regular links have totally geodesic checkerboard surfaces; these two links satisfy the Volume Density Conjecture. Finally, we give conditions implying that many additional biperiodic alternating links are hyperbolic and admit a positively oriented, unimodular geometric triangulation. We also provide sharp upper and lower volume bounds for these links., 25 pages, 15 figures. V2: Minor changes. Added reference, fixed typos, and clarified proof of Theorem 5.1

Published

2018

41. Uniform Hyperbolicity on Random Sets

Author

Abbas Ali Rashid and Alireza Zamani Bahabadi

Subjects

Statistics and Probability, Tangent bundle, Random map, Hyperbolic set, Mathematical analysis, Limit point, Orbit (dynamics), Statistics, Probability and Uncertainty, Invariant (mathematics), Space (mathematics), Mathematics, Probability measure

Abstract

Let Λ be a random compact invariant (with respect to a random map) set with a uniform tangent bundle splitting. We show that if there is a random non-uniformly hyperbolic variable x0 on Λ and the space of limit points of time averages of random Dirac measures on the orbit of x0 coincides with the space of invariant probability measures supported on Λ then, Λ is a random uniformly hyperbolic set.

Published

2018

42. Realizing algebraic invariants of hyperbolic surfaces

Author

BoGwang Jeon

Subjects

Surface (mathematics), Pure mathematics, Trace (linear algebra), Quaternion algebra, Computer Science::Discrete Mathematics, Applied Mathematics, General Mathematics, Genus (mathematics), Hyperbolic set, Field (mathematics), Invariant (mathematics), Invariant theory, Mathematics

Abstract

Let $S_g$ ($g\geq 2$) be a closed surface of genus $g$. Let $K$ be any real number field and $A$ be any quaternion algebra over $K$ such that $A\otimes_K\mathbb{R}\cong M_2(\mathbb{R})$. We show that there exists a hyperbolic structure on $S_g$ such that $K$ and $A$ arise as its invariant trace field and invariant quaternion algebra.

Published

2018

43. Quasi-shadowing Property on Random Partially Hyperbolic Sets

Author

Yujun Zhu, Xinsheng Wang, and Lin Wang

Subjects

Pure mathematics, Property (programming), Applied Mathematics, General Mathematics, Hyperbolic set, Product (mathematics), Image (category theory), Structure (category theory), Center (category theory), Motion (geometry), Orbit (control theory), Mathematics

Abstract

In this paper we investigate the quasi-shadowing property for C1 random dynamical systems on their random partially hyperbolic sets. It is shown that for any pseudo orbit {xk} −∞ +∞ on a random partially hyperbolic set there exists a “center” pseudo orbit {yk} −∞ +∞ shadowing it in the sense that yk+1 is obtained from the image of yk by a motion along the center direction. Moreover, when the random partially hyperbolic set has a local product structure, the above “center” pseudo orbit {yk} −∞ +∞ can be chosen such that yk+1 and the image of yk lie in their common center leaf.

Published

2018

44. Real structures on marked Schottky space

Author

Rubén A. Hidalgo and Sebastian Sarmiento

Subjects

Pure mathematics, General Mathematics, Riemann surface, 010102 general mathematics, Dimension (graph theory), Holomorphic function, Zero (complex analysis), Mathematics::Geometric Topology, 01 natural sciences, symbols.namesake, Bounded function, Hyperbolic set, 0103 physical sciences, symbols, 010307 mathematical physics, 0101 mathematics, Complex manifold, Handlebody, Mathematics

Abstract

Schottky groups are exactly those Kleinian groups providing the regular lowest planar uniformizations of closed Riemann surfaces and also the ones providing to the interior of a handlebody of a complete hyperbolic structure with injectivity radius bounded away from zero. The space parametrizing quasiconformal deformations of Schottky groups of a fixed rank $g \geq 1$ is the marked Schottky space ${\mathcal M}{\mathcal S}_{g}$; this being a complex manifold of dimension $3(g-1)$ for $g \geq 2$ and being isomorphic to the punctured unit disc for $g=1$. In this paper we provide a complete description of the real structures of ${\mathcal M}{\mathcal S}_{g}$, up to holomorphic automorphisms, together their real part.

Published

2018

45. Octahedral developing of knot complement I: Pseudo-hyperbolic structure

Author

Hyuk Kim, Seokbeom Yoon, and Seonhwa Kim

Subjects

Knot complement, Pure mathematics, Hyperbolic geometry, 010102 general mathematics, Holonomy, Volume conjecture, Geometric Topology (math.GT), Torus, Algebraic geometry, 57M25, 57M50, Mathematics::Geometric Topology, 01 natural sciences, Mathematics - Geometric Topology, Knot (unit), Hyperbolic set, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, Geometry and Topology, 0101 mathematics, Mathematics

Abstract

It is known that a knot complement can be decomposed into ideal octahedra along a knot diagram. A solution to the gluing equations applied to this decomposition gives a pseudo-developing map of the knot complement, which will be called a pseudo-hyperbolic structure. In this paper, we study these in terms of segment and region variables which are motivated by the volume conjecture so that we can compute complex volumes of all the boundary parabolic representations explicitly. We investigate the octahedral developing and holonomy representation carefully, and obtain a concrete formula of Wirtinger generators for the representation and also cusp shape. We demonstrate explicit solutions for $T(2,N)$ torus knots, $J(N,M)$ knots and also for other interesting knots as examples. Using these solutions we can observe the asymptotic behavior of complex volumes and cusp shapes of these knots. We note that this construction works for any knot or link, and reflects systematically both geometric properties of the knot complement and combinatorial aspect of the knot diagram., 55 pages, 31 figures

Published

2018

46. On the Infinite Loch Ness monster

Author

Camilo Ramírez Maluendas and John A. Arredondo

Subjects

Physics, Mathematics - Geometric Topology, Pure mathematics, General Mathematics, Hyperbolic set, FOS: Mathematics, Structure (category theory), Geometric Topology (math.GT), Surface (topology), Translation (geometry), 54.75, 51M15, Monster

Abstract

In this paper we present in a topological way the construction of the orientable surface with only one end and infinite genus, called \emph{The Infinite Loch Ness Monster}. In fact, we introduce a flat and hyperbolic construction of this surface. We discuss how the name of this surface has evolved and how it has been historically understood.

Published

2018

47. Determining isotopy classes of crossing arcs in alternating links

Author

Anastasiia Tsvietkova

Subjects

Triangulation (topology), Ideal (set theory), Geodesic, Applied Mathematics, General Mathematics, 010102 general mathematics, Geometric Topology (math.GT), 57M25, 57M50, Mathematics::Geometric Topology, 01 natural sciences, Combinatorics, Mathematics - Geometric Topology, Simple (abstract algebra), Hyperbolic set, FOS: Mathematics, Isotopy, 0101 mathematics, Link (knot theory), Complement (set theory), Mathematics

Abstract

Given a reduced alternating diagram for a link, we obtain conditions that guarantee that the link complement has a complete hyperbolic structure, crossing arcs are the edges of an ideal geodesic triangulation, and every crossing arc is isotopic to a simple geodesic. The latter was conjectured by Sakuma and Weeks in 1995. We provide infinite families of closed braids for which our conditions hold., To appear in Asian Journal of Matematics. 18 pages, 12 figures

Published

2018

48. <tex-math id='M1'>\begin{document}$C^1$\end{document}</tex-math> weak Palis conjecture for nonsingular flows

Author

Qianying Xiao and Zuohuan Zheng

Subjects

Pure mathematics, Generic property, Applied Mathematics, Center (category theory), Periodic point, Morse–Smale system, 01 natural sciences, Flow (mathematics), Hyperbolic set, 0103 physical sciences, Discrete Mathematics and Combinatorics, Vector field, 010307 mathematical physics, Analysis, Center manifold, Mathematics

Abstract

This paper focuses on generic properties of continuous dynamical systems. We prove \begin{document}$C^1$\end{document} weak Palis conjecture for nonsingular flows: Morse-Smale vector fields and vector fields admitting horseshoes are open and dense among \begin{document}$C^1$\end{document} nonsingular vector fields. Our arguments contain three main ingredients: linear Poincare flow, Liao's selecting lemma and the adapting of Crovisier's central model. Firstly, by studying the linear Poincare flow, we prove for a \begin{document}$C^1$\end{document} generic vector field away from horseshoes, any non-trivial nonsingular chain recurrent class contains a minimal set which is partially hyperbolic with 1-dimensional center with respect to the linear Poincare flow. Secondly, to understand the neutral behaviour of the 1-dimensional center, we adapt Crovisier's central model. The difficulties are that we can not build invariant plaque family of any time, the periodic point of a flow is not periodic for the discrete time map. Through delicate analysis of the center manifold of a periodic orbit near the partially hyperbolic set, we manage to yield nice periodic points such that their stable manifolds and unstable manifolds are well-placed for transverse intersection.

Published

2018

49. Hyperbolic dynamics of discrete dynamical systems on pseudo-riemannian manifolds

Author

Mohammadreza Molaei

Subjects

Pure mathematics, Mathematics::Dynamical Systems, General Mathematics, Hyperbolic space, Dynamical Systems (math.DS), Submanifold, Pseudo-Riemannian manifold, Manifold, symbols.namesake, Hyperbolic set, Attractor, FOS: Mathematics, Tangent space, symbols, Mathematics::Differential Geometry, Diffeomorphism, Mathematics - Dynamical Systems, Mathematics

Abstract

We consider a discrete dynamical system on a pseudo-Riemannian manifold and we determine the concept of a hyperbolic set for it. We insert a condition in the definition of a hyperbolic set which implies to the unique decomposition of a part of tangent space (at each point of this set) to two unstable and stable subspaces with exponentially increasing and exponentially decreasing dynamics on them. We prove the continuity of this decomposition via the metric created by a torsion-free pseudo-Riemannian connection. We present a global attractor for a diffeomorphism on an open submanifold of the hyperbolic space \begin{document}$H^2(1)$\end{document} which is not a hyperbolic set for it.

Published

2018

50. Shadowable chain transitive sets.

Author

Sakai, Kazuhiro

Subjects

*DIFFEOMORPHISMS, *MANIFOLDS (Mathematics), *SET theory, *HYPERBOLIC functions, *DIFFERENTIAL topology

Abstract

Letfbe a diffeomorphism of a closedmanifoldM, and letbe a closedf-invariant set. In this paper, by applying the reasoning developed in Wen et al. [J. Differ. Equ. 246 (2009), pp. 340–357] based on Liao, we study chain transitive sets in view of shadowing theory, and it is proved thatis chain transitive and-stably shadowing if and only ifis hyperbolic basic set. As a corollary, for a chain componentoff, it is proved thatis-stably shadowing if and only ifis a hyperbolic homoclinic class. [ABSTRACT FROM AUTHOR]

Published

2013