Phys 219-13!
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| * Questions in the exam will be like those of the qualifier exams. The contents of lecture note 7 are extremely important, since they are the basic principles without which you will have a hard time doing any problem. They are like $$F = ma, F = \frac{dp}{dt}; \frac{d}{dt} \frac{\partial L}{\partial \dot q} = \frac{dL}{dq}; \frac{\partial H}{\partial p} = \dot q, \frac{\partial H}{\partial q} = -\dot p, \frac{\partial H}{\partial t} = \frac{dH}{dt}$$ of classical mechanics. In a minimalist fashion, one must know these basic laws very well and then apply them to various problems that we did in homework and examples in lecture notes. And, go over past qualifier problems given below. | * Questions in the exam will be like those of the qualifier exams. The contents of lecture note 7 are extremely important, since they are the basic principles without which you will have a hard time doing any problem. They are like $$F = ma, F = \frac{dp}{dt}; \frac{d}{dt} \frac{\partial L}{\partial \dot q} = \frac{dL}{dq}; \frac{\partial H}{\partial p} = \dot q, \frac{\partial H}{\partial q} = -\dot p, \frac{\partial H}{\partial t} = \frac{dH}{dt}$$ of classical mechanics. In a minimalist fashion, one must know these basic laws very well and then apply them to various problems that we did in homework and examples in lecture notes. And, go over past qualifier problems given below. '''It is extremely important to know when and how to start from partition function, Gibbs partitiona function, or the grand partition function, and derive every properties that you need frmo it.''' |
Exam
Questions in the exam will be like those of the qualifier exams. The contents of lecture note 7 are extremely important, since they are the basic principles without which you will have a hard time doing any problem. They are like $$F = ma, F = \frac{dp}{dt}; \frac{d}{dt} \frac{\partial L}{\partial \dot q} = \frac{dL}{dq}; \frac{\partial H}{\partial p} = \dot q, \frac{\partial H}{\partial q} = -\dot p, \frac{\partial H}{\partial t} = \frac{dH}{dt}$$ of classical mechanics. In a minimalist fashion, one must know these basic laws very well and then apply them to various problems that we did in homework and examples in lecture notes. And, go over past qualifier problems given below. It is extremely important to know when and how to start from partition function, Gibbs partitiona function, or the grand partition function, and derive every properties that you need frmo it.
Past qualifier exams: 2010-2012, 2005-2009, 2000-2004, 1995-1999
Homework
Homework 5, due June 6: Phase transition (with solutions (for analytical questions))
Codes: Python program for calculating the fugacity of a BEC gas (first problem), Python program for Monte Carlo (last problem). – 9:55PM, May 27, 2013
Plotting: In case you like to plot things up in Python, here is some information that might be helpful: Plotting examples, Python, scipy, matplotlib. – 9:55PM, May 27, 2013
Homework 4, due May 21: Quantum statistical mechanics (with solutions)
Correction: Problem 6 (a): the factor $\frac{1}{2}$ multiplies $\vec a \cdot \vec \sigma$ also. Also, $\sigma \rightarrow \vec \sigma$, right after "where." – 8:28PM, May 19, 2013
Homework 3, due May 6: Ensembles, semi-classical (with solutions)
Addition: (Solutions) Pages 10,11: addendum (the van der Waals equation). – 10:36PM, Jun 06, 2013
Correction: (Solutions) $Z$ in page 9 (the power of $\bar V$, corrected). – 10:36PM, Jun 06, 2013
Homework 2, due Apr 23: Probability (with solutions)
Correction: Problem 7(a): Eq. 5.22 (red). – 9:05AM, Apr 18, 2013
Correction: Problem 6(c): Phys. Rev. B → Phys. Rev. E. – 12:18PM, Apr 15, 2013
Homework 1, due Apr 12: Thermodynamics – review (with solutions)
Correction, Addition: Problem 4 (red). Also, a sentence added at top (maximum entropy). – 8:42AM, Apr 06, 2013