Axiomatics of classical statistical mechanics Rudolf Kurth.
Material type: TextPublication details: Mineola: Dover Publications, 2019.Edition: Dover editionDescription: viii, 180 pages : 22 cmISBN:- 9780486832753 (paperback)
- 0486832759 (paperback)
- 530.13 K967A 23
- QC175 .K85 2019
Item type | Current library | Collection | Call number | Status | Notes | Date due | Barcode | |
---|---|---|---|---|---|---|---|---|
Books | Central Library, IISER Bhopal Reference Section | Reference | 530.13 K967A (Browse shelf(Opens below)) | Not For Loan | Book recommended by Dr Arnab Rudra | 11538 |
Originally published: New York : Pergamon Press, 1960, as volume 11 in the International series of monographs in pure and applied mathematics.
Includes bibliographical references and index.
Introduction. Statement of the problem -- Mathematical tools. Sets -- Mapping -- Point sets in the n-dimensional vector space Rn -- Topological mapping in vector spaces -- Systems of ordinary differential equations -- The lebesgue measure -- The Lebesgue integral -- Hubert spaces -- The phase flows of mechanical systems. Mechanical systems -- Phase flow; Liouville's theorem -- Stationary measure-conserving phase flow; Poincaré's, Hopf's and Jacobi's theorems.
The theorems of V. Neumann and Birkhoff; the ergodic hypothesis -- The initial distribution of probability in the phase space. A formal description of the concept of probability -- On the application of the concept of probability -- Probability distributions which depend on time. Mechanical systems with general equations of motion -- Hamiltonian and newtonian systems -- The initial value problem -- The approach of mechanical systems towards states of statistical equilibrium -- Time-independent probability distributions. Fluctuations in statistical equilibrium -- Gibbs's canonic probability distribution -- Statistical thermodynamics. The equation of state -- The fundamental laws of thermodynamics -- Entropy and probability.
"Requiring only familiarity with the elements of calculus and analytical geometry, this monograph constructs classical statistical mechanics as a deductive system, based on the equations of motion and the basic postulates of probability. The book consists chiefly of theorems and proofs that are expressed in a manner that reveals the theory's logical structure. A chapter on mathematical tools makes the treatment as self-contained as possible."--
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