theories:statistical_mechanics
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theories:statistical_mechanics [2017/10/27 11:00] jakobadmin ↷ Page moved from statistical_mechanics to theories:statistical_mechanics |
theories:statistical_mechanics [2020/07/23 05:03] (current) 2001:56a:f8bd:8100:181c:f577:a2fd:d07 [Concrete] |
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| ====== Statistical Mechanics ====== | ====== Statistical Mechanics ====== | ||
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| - | <tabbox Why is it interesting?> | ||
| - | Statistical mechanics is a framework that allows us to describe systems with many degrees of freedom, although we don't know all the microscopic details. For example, using statistical mechanics, we can describe a gas or a block of metal, although we don't know all individual atom configurations. | + | <tabbox Intuitive> |
| - | + | ||
| - | **Important Related Concepts:** | + | |
| - | + | ||
| - | + | ||
| - | * [[statistical_mechanics:entropy]] | + | |
| - | * [[statistical_mechanics:thermodynamics]] | + | |
| - | <tabbox Layman> | + | |
| <note tip> | <note tip> | ||
| Line 16: | Line 9: | ||
| </note> | </note> | ||
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| - | <tabbox Student> | + | <tabbox Concrete> |
| **Recommended Resources:** | **Recommended Resources:** | ||
| * [[http://philsci-archive.pitt.edu/9133/2/What_is_SM.pdf|What is Statistical Mechanics?]] by Roman Frigg | * [[http://philsci-archive.pitt.edu/9133/2/What_is_SM.pdf|What is Statistical Mechanics?]] by Roman Frigg | ||
| - | * See also [[https://github.com/rht/phython/blob/master/review/statmech.pdf|this review]], and [[https://github.com/rht/phython/blob/master/review/statmech2.pdf|part 2]. | + | * The Principles of Statistical Mechanics by Richard C. Tolman |
| - | * A great explanation how one can derive the Boltzman distribution from the principle of maximal entropy is given at page 3 in https://arxiv.org/pdf/1311.0813.pdf | + | * See also [[https://github.com/rht/phython/blob/master/review/statmech.pdf|this review]], and [[https://github.com/rht/phython/blob/master/review/statmech2.pdf|part 2]]. |
| - | + | * A great explanation how one can derive the Boltzmann distribution from the principle of maximal entropy is given at page 3 in https://arxiv.org/pdf/1311.0813.pdf | |
| - | <tabbox Researcher> | + | * Fundamentals of Statistical and Thermal Physics by F. Reif |
| + | * A crash course in Statistical Mechanics https://scholar.harvard.edu/files/noahmiller/files/statistical_mechanics.pdf | ||
| + | <tabbox Abstract> | ||
| - | <note tip> | ||
| - | The motto in this section is: //the higher the level of abstraction, the better//. | ||
| - | </note> | ||
| - | --> Common Question 1# | + | [{{ :theories:classical_theories:image_20171011_153609.png?nolink |Source: Where do quantum field theories come from? by McGreevy}}] |
| - | + | ---- | |
| - | <-- | + | |
| - | --> Common Question 2# | + | **Recommended Resources:** |
| - | + | * http://www.damtp.cam.ac.uk/user/tong/sft.html | |
| - | <-- | + | |
| - | + | ||
| - | <tabbox Examples> | + | |
| - | --> Example1# | + | <tabbox Why is it interesting?> |
| - | + | Statistical mechanics is a framework that allows us to describe systems with many degrees of freedom, although we don't know all the microscopic details. For example, using statistical mechanics we can describe a gas or a block of metal, although we don't know all individual atom configurations. | |
| - | <-- | + | |
| - | --> Example2:# | ||
| - | |||
| - | <-- | ||
| - | | ||
| - | <tabbox History> | ||
| </tabbox> | </tabbox> | ||
theories/statistical_mechanics.1509094818.txt.gz · Last modified: 2017/12/04 08:01 (external edit)
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