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Geometric Optics on Phase Space

Author: Kurt Bernardo Wolf

Publisher: Springer Science & Business Media

Published: 2004-07-21

Total Pages: 400

ISBN-13: 9783540220398

Symplectic geometry, well known as the basic structure of Hamiltonian mechanics, is also the foundation of optics. In fact, optical systems (geometric or wave) have an even richer symmetry structure than mechanical ones (classical or quantum). The symmetries underlying the geometric model of light are based on the symplectic group. Geometric Optics on Phase Space develops both geometric optics and group theory from first principles in their Hamiltonian formulation on phase space. This treatise provides the mathematical background and also collects a host of useful methods of practical importance, particularly the fractional Fourier transform currently used for image processing. The reader will appreciate the beautiful similarities between Hamilton's mechanics and this approach to optics. The appendices link the geometry thus introduced to wave optics through Lie methods. The book addresses researchers and graduate students.

Geometric Phases in Classical and Quantum Mechanics

Author: Dariusz Chruscinski

Publisher: Springer Science & Business Media

Published: 2012-12-06

Total Pages: 337

ISBN-13: 0817681760

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Several well-established geometric and topological methods are used in this work in an application to a beautiful physical phenomenon known as the geometric phase. This book examines the geometric phase, bringing together different physical phenomena under a unified mathematical scheme. The material is presented so that graduate students and researchers in applied mathematics and physics with an understanding of classical and quantum mechanics can handle the text.

The Physics of Phase Space

Author: Young S. Kim

Publisher: Springer

Published: 2005-09-13

Total Pages: 457

ISBN-13: 3540479015

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The concept of phase space plays a decisive role in the study of the transition from classical to quantum physics. This is particularly the case in areas such as nonlinear dynamics and chaos, geometric quantization and the study of the various semi-classical theories, which are the setting of the present volume. Much of the content is devoted to the study of the Wigner distribution. This volume gives the first complete survey of the progress made by both mathematicians and physicists. It will serve as an excellent reference for further research.

Geometry of Phase Spaces

Author: Jan J. Slawianowski

Publisher:

Published: 1991

Total Pages: 814

ISBN-13:

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Devoted to the classical analytical mechanics of systems with a finite number of degrees of freedom, with special attention given to some nonstandard problems, both theoretical and practical. Presents the geometric formulation of analytical mechanics in terms of tangent and cotangent bundles and symplectic and contact manifolds. In contrast to purely formal treatments, the author justifies in physical terms the symplectic structure presupposed by classical Hamiltonian mechanics. The result is that the well-known structures of the Hamilton-Jacobi theory are given a deep geometrical interpretation.

Geometric Phases in Physics

Author: F Wilczek

Publisher: World Scientific

Published: 1989-07-01

Total Pages: 528

ISBN-13: 981450758X

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During the last few years, considerable interest has been focused on the phase that waves accumulate when the equations governing the waves vary slowly. The recent flurry of activity was set off by a paper by Michael Berry, where it was found that the adiabatic evolution of energy eigenfunctions in quantum mechanics contains a phase of geometric origin (now known as ‘Berry's phase’) in addition to the usual dynamical phase derived from Schrödinger's equation. This observation, though basically elementary, seems to be quite profound. Phases with similar mathematical origins have been identified and found to be important in a startling variety of physical contexts, ranging from nuclear magnetic resonance and low-Reynolds number hydrodynamics to quantum field theory. This volume is a collection of original papers and reprints, with commentary, on the subject. Contents:Introduction and OverviewAnticipationsFoundationsSome Applications and TestsFractional StatisticsQuantized Hall EffectWess-Zumino Terms and AnomaliesClassical SystemsAsymptotics Readership: Mathematical, high energy and condensed matter physicists.

Symplectic Geometry and Quantum Mechanics

Author: Maurice A. de Gosson

Publisher: Springer Science & Business Media

Published: 2006-08-06

Total Pages: 375

ISBN-13: 3764375752

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This book offers a complete discussion of techniques and topics intervening in the mathematical treatment of quantum and semi-classical mechanics. It starts with a very readable introduction to symplectic geometry. Many topics are also of genuine interest for pure mathematicians working in geometry and topology.

Geometry of Time-Spaces

Author: Olav Arnfinn Laudal

Publisher: World Scientific

Published: 2011

Total Pages: 154

ISBN-13: 9814343358

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This is a monograph about non-commutative algebraic geometry, and its application to physics. The main mathematical inputs are the non-commutative deformation theory, moduli theory of representations of associative algebras, a new non-commutative theory o

Geometry of Phase Spaces

Author: Jan Jerzy Sławianowski

Publisher:

Published: 1991

Total Pages: 792

ISBN-13: 9788301093075

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Geometric Phases in Physics

Author: Frank Wilczek

Publisher: World Scientific

Published: 1989

Total Pages: 530

ISBN-13: 9789971506216

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During the last few years, considerable interest has been focused on the phase that waves accumulate when the equations governing the waves vary slowly. The recent flurry of activity was set off by a paper by Michael Berry, where it was found that the adiabatic evolution of energy eigenfunctions in quantum mechanics contains a phase of geometric origin (now known as ?Berry's phase?) in addition to the usual dynamical phase derived from Schrdinger's equation. This observation, though basically elementary, seems to be quite profound. Phases with similar mathematical origins have been identified and found to be important in a startling variety of physical contexts, ranging from nuclear magnetic resonance and low-Reynolds number hydrodynamics to quantum field theory. This volume is a collection of original papers and reprints, with commentary, on the subject.

Geometric Structures of Phase Space in Multi-Dimensional Chaos

Author: Mikito Toda

Publisher: John Wiley & Sons

Published: 2005-01-03

Total Pages: 711

ISBN-13: 0471714631

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This series provides the chemical physics field with a forum for critical, authoritative evaluations of advances in every area of the discipline. Volume 130 in the series continues to report recent advances with significant, up-to-date chapters by internationally recognized researchers.