Loop Groups, Discrete Versions of Some Classical Integrable Systems, and Rank 2 Extensions

Loop Groups, Discrete Versions of Some Classical Integrable Systems, and Rank 2 Extensions

Author: Percy Deift

Publisher: American Mathematical Soc.

Published: 1992

Total Pages: 114

ISBN-13: 0821825402

DOWNLOAD EBOOK

The authors show how to interpret recent results of Moser and Veselov on discrete versions of a class of classical integrable systems, in terms of a loop group framework. In this framework the discrete systems appear as time-one maps of integrable Hamiltonian flows. Earlier results of Moser on isospectral deformations of rank 2 extensions of a fixed matrix, can also be incorporated into their scheme.


Separatrix Surfaces and Invariant Manifolds of a Class of Integrable Hamiltonian Systems and Their Perturbations

Separatrix Surfaces and Invariant Manifolds of a Class of Integrable Hamiltonian Systems and Their Perturbations

Author: Jaume Llibre

Publisher: American Mathematical Soc.

Published: 1994

Total Pages: 206

ISBN-13: 082182581X

DOWNLOAD EBOOK

This work presents a study of the foliations of the energy levels of a class of integrable Hamiltonian systems by the sets of constant energy and angular momentum. This includes a classification of the topological bifurcations and a dynamical characterization of the criticalleaves (separatrix surfaces) of the foliation. Llibre and Nunes then consider Hamiltonain perturbations of this class of integrable Hamiltonians and give conditions for the persistence of the separatrix structure of the foliations and for the existence of transversal ejection-collision orbits of the perturbed system. Finally, they consider a class of non-Hamiltonian perturbations of a family of integrable systems of the type studied earlier and prove the persistence of "almost all" the tori and cylinders that foliate the energy levels of the unperturbed system as a consequence of KAM theory.


Extension of Positive-Definite Distributions and Maximum Entropy

Extension of Positive-Definite Distributions and Maximum Entropy

Author: Jean-Pierre Gabardo

Publisher: American Mathematical Soc.

Published: 1993

Total Pages: 111

ISBN-13: 0821825518

DOWNLOAD EBOOK

In this work, the maximum entropy method is used to solve the extension problem associated with a positive-definite function, or distribution, defined on an interval of the real line. Garbardo computes explicitly the entropy maximizers corresponding to various logarithmic integrals depending on a complex parameter and investigates the relation to the problem of uniqueness of the extension. These results are based on a generalization, in both the discrete and continuous cases, of Burg's maximum entropy theorem.


Algebraic Integrability of Nonlinear Dynamical Systems on Manifolds

Algebraic Integrability of Nonlinear Dynamical Systems on Manifolds

Author: A.K. Prykarpatsky

Publisher: Springer Science & Business Media

Published: 2013-04-09

Total Pages: 555

ISBN-13: 9401149941

DOWNLOAD EBOOK

In recent times it has been stated that many dynamical systems of classical mathematical physics and mechanics are endowed with symplectic structures, given in the majority of cases by Poisson brackets. Very often such Poisson structures on corresponding manifolds are canonical, which gives rise to the possibility of producing their hidden group theoretical essence for many completely integrable dynamical systems. It is a well understood fact that great part of comprehensive integrability theories of nonlinear dynamical systems on manifolds is based on Lie-algebraic ideas, by means of which, in particular, the classification of such compatibly bi Hamiltonian and isospectrally Lax type integrable systems has been carried out. Many chapters of this book are devoted to their description, but to our regret so far the work has not been completed. Hereby our main goal in each analysed case consists in separating the basic algebraic essence responsible for the complete integrability, and which is, at the same time, in some sense universal, i. e. , characteristic for all of them. Integrability analysis in the framework of a gradient-holonomic algorithm, devised in this book, is fulfilled through three stages: 1) finding a symplectic structure (Poisson bracket) transforming an original dynamical system into a Hamiltonian form; 2) finding first integrals (action variables or conservation laws); 3) defining an additional set of variables and some functional operator quantities with completely controlled evolutions (for instance, as Lax type representation).


An Extension of the Galois Theory of Grothendieck

An Extension of the Galois Theory of Grothendieck

Author: André Joyal

Publisher: American Mathematical Soc.

Published: 1984

Total Pages: 87

ISBN-13: 0821823124

DOWNLOAD EBOOK

In this paper we compare, in a precise way, the concept of Grothendieck topos to the classical notion of topological space. The comparison takes the form of a two-fold extension of the idea of space.


Littlewood-Paley Theory on Spaces of Homogeneous Type and the Classical Function Spaces

Littlewood-Paley Theory on Spaces of Homogeneous Type and the Classical Function Spaces

Author: Yongsheng Han

Publisher: American Mathematical Soc.

Published: 1994

Total Pages: 138

ISBN-13: 0821825925

DOWNLOAD EBOOK

In this work, Han and Sawyer extend Littlewood-Paley theory, Besov spaces, and Triebel-Lizorkin spaces to the general setting of a space of homogeneous type. For this purpose, they establish a suitable analogue of the Calder 'on reproducing formula and use it to extend classical results on atomic decomposition, interpolation, and T1 and Tb theorems. Some new results in the classical setting are also obtained: atomic decompositions with vanishing b-moment, and Littlewood-Paley characterizations of Besov and Triebel-Lizorkin spaces with only half the usual smoothness and cancellation conditions on the approximate identity.


Computation and Combinatorics in Dynamics, Stochastics and Control

Computation and Combinatorics in Dynamics, Stochastics and Control

Author: Elena Celledoni

Publisher: Springer

Published: 2019-01-13

Total Pages: 734

ISBN-13: 3030015939

DOWNLOAD EBOOK

The Abel Symposia volume at hand contains a collection of high-quality articles written by the world’s leading experts, and addressing all mathematicians interested in advances in deterministic and stochastic dynamical systems, numerical analysis, and control theory. In recent years we have witnessed a remarkable convergence between individual mathematical disciplines that approach deterministic and stochastic dynamical systems from mathematical analysis, computational mathematics and control theoretical perspectives. Breakthrough developments in these fields now provide a common mathematical framework for attacking many different problems related to differential geometry, analysis and algorithms for stochastic and deterministic dynamics. In the Abel Symposium 2016, which took place from August 16-19 in Rosendal near Bergen, leading researchers in the fields of deterministic and stochastic differential equations, control theory, numerical analysis, algebra and random processes presented and discussed the current state of the art in these diverse fields. The current Abel Symposia volume may serve as a point of departure for exploring these related but diverse fields of research, as well as an indicator of important current and future developments in modern mathematics.


Random Perturbations of Hamiltonian Systems

Random Perturbations of Hamiltonian Systems

Author: Mark Iosifovich Freĭdlin

Publisher: American Mathematical Soc.

Published: 1994

Total Pages: 97

ISBN-13: 0821825860

DOWNLOAD EBOOK

Random perturbations of Hamiltonian systems in Euclidean spaces lead to stochastic processes on graphs, and these graphs are defined by the Hamiltonian. In the case of white-noise type perturbations, the limiting process will be a diffusion process on the graph. Its characteristics are expressed through the Hamiltonian and the characteristics of the noise. Freidlin and Wentzell calculate the process on the graph under certain conditions and develop a technique which allows consideration of a number of asymptotic problems. The Dirichlet problem for corresponding elliptic equations with a small parameter are connected with boundary problems on the graph.


Unraveling the Integral Knot Concordance Group

Unraveling the Integral Knot Concordance Group

Author: Neal W. Stoltzfus

Publisher: American Mathematical Soc.

Published: 1977

Total Pages: 103

ISBN-13: 082182192X

DOWNLOAD EBOOK

The group of concordance classes of high dimensional homotopy spheres knotted in codimension two in the standard sphere has an intricate algebraic structure which this paper unravels. The first level of invariants is given by the classical Alexander polynomial. By means of a transfer construction, the integral Seifert matrices of knots whose Alexander polynomial is a power of a fixed irreducible polynomial are related to forms with the appropriate Hermitian symmetry on torsion free modules over an order in the algebraic number field determined by the Alexander polynomial. This group is then explicitly computed in terms of standard arithmetic invariants. In the symmetric case, this computation shows there are no elements of order four with an irreducible Alexander polynomial. Furthermore, the order is not necessarily Dedekind and non-projective modules can occur. The second level of invariants is given by constructing an exact sequence relating the global concordance group to the individual pieces described above. The integral concordance group is then computed by a localization exact sequence relating it to the rational group computed by J. Levine and a group of torsion linking forms.