Stability of KAM Tori for Nonlinear Schrödinger Equation

Stability of KAM Tori for Nonlinear Schrödinger Equation
Title Stability of KAM Tori for Nonlinear Schrödinger Equation PDF eBook
Author Hongzi Cong
Publisher American Mathematical Soc.
Pages 100
Release 2016-01-25
Genre Mathematics
ISBN 1470416573

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The authors prove the long time stability of KAM tori (thus quasi-periodic solutions) for nonlinear Schrödinger equation subject to Dirichlet boundary conditions , where is a real Fourier multiplier. More precisely, they show that, for a typical Fourier multiplier , any solution with the initial datum in the -neighborhood of a KAM torus still stays in the -neighborhood of the KAM torus for a polynomial long time such as for any given with , where is a constant depending on and as .

Semicrossed Products of Operator Algebras by Semigroups

Semicrossed Products of Operator Algebras by Semigroups
Title Semicrossed Products of Operator Algebras by Semigroups PDF eBook
Author Kenneth R. Davidson
Publisher American Mathematical Soc.
Pages 110
Release 2017-04-25
Genre Mathematics
ISBN 147042309X

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The authors examine the semicrossed products of a semigroup action by -endomorphisms on a C*-algebra, or more generally of an action on an arbitrary operator algebra by completely contractive endomorphisms. The choice of allowable representations affects the corresponding universal algebra. The authors seek quite general conditions which will allow them to show that the C*-envelope of the semicrossed product is (a full corner of) a crossed product of an auxiliary C*-algebra by a group action. Their analysis concerns a case-by-case dilation theory on covariant pairs. In the process we determine the C*-envelope for various semicrossed products of (possibly nonselfadjoint) operator algebras by spanning cones and lattice-ordered abelian semigroups.

Intersection Local Times, Loop Soups and Permanental Wick Powers

Intersection Local Times, Loop Soups and Permanental Wick Powers
Title Intersection Local Times, Loop Soups and Permanental Wick Powers PDF eBook
Author Yves Le Jan
Publisher American Mathematical Soc.
Pages 92
Release 2017-04-25
Genre Mathematics
ISBN 1470436957

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Several stochastic processes related to transient Lévy processes with potential densities , that need not be symmetric nor bounded on the diagonal, are defined and studied. They are real valued processes on a space of measures endowed with a metric . Sufficient conditions are obtained for the continuity of these processes on . The processes include -fold self-intersection local times of transient Lévy processes and permanental chaoses, which are `loop soup -fold self-intersection local times' constructed from the loop soup of the Lévy process. Loop soups are also used to define permanental Wick powers, which generalizes standard Wick powers, a class of -th order Gaussian chaoses. Dynkin type isomorphism theorems are obtained that relate the various processes. Poisson chaos processes are defined and permanental Wick powers are shown to have a Poisson chaos decomposition. Additional properties of Poisson chaos processes are studied and a martingale extension is obtained for many of the processes described above.

The Role of Advection in a Two-Species Competition Model: A Bifurcation Approach

The Role of Advection in a Two-Species Competition Model: A Bifurcation Approach
Title The Role of Advection in a Two-Species Competition Model: A Bifurcation Approach PDF eBook
Author Isabel Averill
Publisher American Mathematical Soc.
Pages 118
Release 2017-01-18
Genre Mathematics
ISBN 1470422026

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The effects of weak and strong advection on the dynamics of reaction-diffusion models have long been studied. In contrast, the role of intermediate advection remains poorly understood. For example, concentration phenomena can occur when advection is strong, providing a mechanism for the coexistence of multiple populations, in contrast with the situation of weak advection where coexistence may not be possible. The transition of the dynamics from weak to strong advection is generally difficult to determine. In this work the authors consider a mathematical model of two competing populations in a spatially varying but temporally constant environment, where both species have the same population dynamics but different dispersal strategies: one species adopts random dispersal, while the dispersal strategy for the other species is a combination of random dispersal and advection upward along the resource gradient. For any given diffusion rates the authors consider the bifurcation diagram of positive steady states by using the advection rate as the bifurcation parameter. This approach enables the authors to capture the change of dynamics from weak advection to strong advection. The authors determine three different types of bifurcation diagrams, depending on the difference of diffusion rates. Some exact multiplicity results about bifurcation points are also presented. The authors' results can unify some previous work and, as a case study about the role of advection, also contribute to the understanding of intermediate (relative to diffusion) advection in reaction-diffusion models.

Hyperbolically Embedded Subgroups and Rotating Families in Groups Acting on Hyperbolic Spaces

Hyperbolically Embedded Subgroups and Rotating Families in Groups Acting on Hyperbolic Spaces
Title Hyperbolically Embedded Subgroups and Rotating Families in Groups Acting on Hyperbolic Spaces PDF eBook
Author F. Dahmani
Publisher American Mathematical Soc.
Pages 164
Release 2017-01-18
Genre Mathematics
ISBN 1470421941

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he authors introduce and study the notions of hyperbolically embedded and very rotating families of subgroups. The former notion can be thought of as a generalization of the peripheral structure of a relatively hyperbolic group, while the latter one provides a natural framework for developing a geometric version of small cancellation theory. Examples of such families naturally occur in groups acting on hyperbolic spaces including hyperbolic and relatively hyperbolic groups, mapping class groups, , and the Cremona group. Other examples can be found among groups acting geometrically on spaces, fundamental groups of graphs of groups, etc. The authors obtain a number of general results about rotating families and hyperbolically embedded subgroups; although their technique applies to a wide class of groups, it is capable of producing new results even for well-studied particular classes. For instance, the authors solve two open problems about mapping class groups, and obtain some results which are new even for relatively hyperbolic groups.

Exotic Cluster Structures on $SL_n$: The Cremmer-Gervais Case

Exotic Cluster Structures on $SL_n$: The Cremmer-Gervais Case
Title Exotic Cluster Structures on $SL_n$: The Cremmer-Gervais Case PDF eBook
Author M. Gekhtman
Publisher American Mathematical Soc.
Pages 106
Release 2017-02-20
Genre Mathematics
ISBN 1470422581

Download Exotic Cluster Structures on $SL_n$: The Cremmer-Gervais Case Book in PDF, Epub and Kindle

This is the second paper in the series of papers dedicated to the study of natural cluster structures in the rings of regular functions on simple complex Lie groups and Poisson–Lie structures compatible with these cluster structures. According to our main conjecture, each class in the Belavin–Drinfeld classification of Poisson–Lie structures on corresponds to a cluster structure in . The authors have shown before that this conjecture holds for any in the case of the standard Poisson–Lie structure and for all Belavin–Drinfeld classes in , . In this paper the authors establish it for the Cremmer–Gervais Poisson–Lie structure on , which is the least similar to the standard one.

On Dwork's $p$-Adic Formal Congruences Theorem and Hypergeometric Mirror Maps

On Dwork's $p$-Adic Formal Congruences Theorem and Hypergeometric Mirror Maps
Title On Dwork's $p$-Adic Formal Congruences Theorem and Hypergeometric Mirror Maps PDF eBook
Author E. Delaygue
Publisher American Mathematical Soc.
Pages 106
Release 2017-02-20
Genre Mathematics
ISBN 1470423006

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Using Dwork's theory, the authors prove a broad generalization of his famous -adic formal congruences theorem. This enables them to prove certain -adic congruences for the generalized hypergeometric series with rational parameters; in particular, they hold for any prime number and not only for almost all primes. Furthermore, using Christol's functions, the authors provide an explicit formula for the “Eisenstein constant” of any hypergeometric series with rational parameters. As an application of these results, the authors obtain an arithmetic statement “on average” of a new type concerning the integrality of Taylor coefficients of the associated mirror maps. It contains all the similar univariate integrality results in the literature, with the exception of certain refinements that hold only in very particular cases.