Annotations To Quantum Statistical Mechanics
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Annotations to Quantum Statistical Mechanics
This book is a rewritten and annotated version of Leo P. Kadanoff and Gordon Baym’s lectures that were presented in the book Quantum Statistical Mechanics: Green’s Function Methods in Equilibrium and Nonequilibrium Problems. The lectures were devoted to a discussion on the use of thermodynamic Green’s functions in describing the properties of many-particle systems. The functions provided a method for discussing finite-temperature problems with no more conceptual difficulty than ground-state problems, and the method was equally applicable to boson and fermion systems and equilibrium and nonequilibrium problems. The lectures also explained nonequilibrium statistical physics in a systematic way and contained essential concepts on statistical physics in terms of Green’s functions with sufficient and rigorous details. In-Gee Kim thoroughly studied the lectures during one of his research projects but found that the unspecialized method used to present them in the form of a book reduced their readability. He started the tedious work of rewriting and annotating them to fully understand the formalism of nonequilibrium quantum statistical mechanics. While doing so, he realized they can be a useful resource for students of modern physics but will have to be upgraded to match pace with the evolved curricula. Being aware that besides completing the course work and passing the relevant examinations, it is necessary for graduate students of modern physics to make the knowledge of a topic concrete in their minds. This book is a systematically prepared summary of those lectures and will be extremely useful for graduate students as well as senior researchers to settle down the key knowledge of the subject.
Scientific and Technical Aerospace Reports
Lists citations with abstracts for aerospace related reports obtained from world wide sources and announces documents that have recently been entered into the NASA Scientific and Technical Information Database.
Principia: The Mathematical Principles of Natural Philosophy (Annotated)
The Mathematical Principles of Natural Philosophy, by Isaac Newton (1642 - 1727) Translated into English by Andrew Motte (1693 - 1728) Published by Daniel Adee, 1846. Edited by N. W. Chittenden Images and text used from Wikisource (Public Domain) Addendum, by Nicolae Sfetcu: - Historical context: Action at a distance - The methodology of Isaac Newton - The dispute over the priority of the law of gravity Cover: Portrait of Isaac Newton (1642-1727), by Godfrey Kneller (1646–1723), oil on canvas, 1689, Collection Isaac Newton Institute (cropped and processed) The Mathematical Principles of Natural Philosophy (Latin: "Philosophiae naturalis principia mathematica"), often abbreviated as Principia or Principia Mathematica, the Isaac Newton's masterpiece, was published in London on July 5, 1687. The text of the third edition in Latin, 1726 , will be revised and enriched for the last time by Newton, being generally considered as a reference. The book is one of the most important scientific books ever published, being the foundation of classical mechanics. It is considered by most physicists to be the most famous book in this field. Newton applies here the mathematical laws to the study of natural phenomena. The book contains Newton's laws of motion that formed the basis of Newtonian mechanics, as well as the universal law of gravity. Most translations of the book are based on Newton's third edition in 1726. The first translation, in 1729, belongs to Andrew Motte, republished in 1846 by Daniel Adee as the first American edition, edited by N. W. Chittenden. The book begins with definitions, laws, or axioms, followed by three parts (or "books") about "the motion of bodies" and "the system of the world." “This most beautiful system of the sun, planets and comets, could only proceed from the counsel and dominion of an intelligent and powerful Being... This Being governs all things, not as the soul of the world, but as Lord over all; and on account of his dominion he is wont, to be called Lord God παντοκρατωρ or Universal Ruler.” (Isaac Newton) ”The whole evolution of our ideas about the processes of nature … might be regarded as an organic development of Newton’s work.” (Subrahmanyan Chandrasekhar)