Spectral mapping theorems and invariant manifolds for infinite-dimensional Hamiltonian systems /

Stanislavova, Milena

January 2000

Thesis (Ph. D.)--University of Missouri-Columbia, 2000. / Typescript. Vita. Includes bibliographical references (leaves 71-78). Also available on the Internet.

Spectral mapping theorems and invariant manifolds for infinite-dimensional Hamiltonian systems

Stanislavova, Milena

January 2000

Thesis (Ph. D.)--University of Missouri-Columbia, 2000. / Typescript. Vita. Includes bibliographical references (leaves 71-78). Also available on the Internet.

Billiards and statistical mechanics

Grigo, Alexander.

January 2009

Thesis (Ph.D)--Mathematics, Georgia Institute of Technology, 2009. / Committee Chair: Bunimovich, Leonid; Committee Member: Bonetto, Federico; Committee Member: Chow, Shui-Nee; Committee Member: Cvitanovic, Predrag; Committee Member: Weiss, Howard. Part of the SMARTech Electronic Thesis and Dissertation Collection.

Dynamics of quantum control in cold-atom systems

Roy, Analabha, 1978-

16 October 2012

The dynamics of mesoscopic two-boson systems that model an interacting pair of ultracold alkali atoms in the presence of electromagnetic potentials are considered. The translational degrees of freedom of such a system can be described by a simple reduced atom Hamiltonian. Introducing time modulations in the laser fields causes parametric variations of the Hamiltonian's Floquet eigenvalue spectrum. Broken symmetries cause level repulsion and avoided crossings in this spectrum that are quantum manifestations of the chaos in the underlying classical dynamics of the systems. We investigate the effects of this phenomenon in the coherent control of excitations in these systems. These systems can be coherently excited from their ground states to higher energy states via a Stimulated Raman Adiabatic Passage (STIRAP). The presence of avoided crossings alter the outcome of STIRAP. First, the classical dynamics of such two-boson systems in double wells is described and manifestations of the same to the quantum mechanical system are discussed. Second, the quantum dynamics of coherent control in the manner discussed above is detailed for a select choice(s) of system parameters. Finally, the same chaos-assisted adiabatic passage is demonstrated for optical lattice systems based on experiments on the same done with noninteracting atoms. / text

Quantum theory

Mesoscopic phenomena (Physics)

Hamiltonian systems

Bosons

Lattice theory

Star-unitary transformation and stochasticity: emergence of white, 1/f noise through resonances

Kim, Sungyun

28 August 2008

Not available / text

Hamilton's equations with Euler parameters for hybrid particle-finite element simulation of hypervelocity impact

Shivarama, Ravishankar Ajjanagadde

28 August 2008

Not available / text

Impact--Mathematical models

Finite element method

Hamiltonian systems

Lagrange equations

Numerical studies of the standard nontwist map and a renormalization group framework for breakup of invariant tori

Apte, Amit Shriram

28 August 2008

Not available / text

Renormalization group

Torus (Geometry)

Bifurcation theory

Hamiltonian systems

Renormalization of continuous-time dynamical systems with KAM applications

Kocić, Saša

28 August 2008

Not available

Renormalization (Physics)

Renormalization group

Vector fields

Hamiltonian systems

The U-transformation and the Hamiltonian techniques for the finite strip method

李鷹, Li, Ying.

January 1996

published_or_final_version / Civil and Structural Engineering / Doctoral / Doctor of Philosophy

Structural analysis (Engineering)

Unitary transformations.

Hamiltonian systems.

Finite strip method.

Loop algebras and algebraic geometry

Miscione, Steven.

January 2008

This thesis primarily discusses the results of two papers, [Hu] and [HaHu]. The first is an overview of algebraic-geometric techniques for integrable systems in which the AKS theorem is proven. Under certain conditions, this theorem asserts the commutatvity and (potential) non-triviality of the Hamiltonian flow of Ad*-invariant functions once they're restricted to subalgebras. This theorem is applied to the case of coadjoint orbits on loop algebras, identifying the flow with a spectral curve and a line bundle via the Lax equation. These results play an important role in the discussion of [HaHu], wherein we consider three levels of spaces, each possessing a linear family of Poisson spaces. It is shown that there exist Poisson mappings between these levels. We consider the two cases where the underlying Riemann surface is an elliptic curve, as well as its degeneration to a Riemann sphere with two points identified (the trigonometric case). Background in necessary areas is provided.

Geometry, Algebraic.

Hamiltonian systems.

Loops (Group theory)

Poisson manifolds.