Time: MWF 9-10am

Instructor: Mark Newman

Office: 277 West Hall

Office hours: Thursdays 1:30-3:30pm

Email: mejn@umich.edu

Grader: Manavendra Mahato

Office: 3484F Randall

Office hours: Wednesdays 4-5pm

Email: mmahato@umich.edu

**Description:** This course provides an introduction to the
fundamentals of thermal physics including classical thermodynamics (the
three laws, temperature, internal energy, entropy, and applications) and
statistical mechanics (microscopic entropy, classical and quantum thermal
distributions, ideal gases, Fermi and Bose gases, thermal radiation,
electrons in metals, Bose-Einstein condensation, superfluidity).

**Course pack (required):** A required course pack for this course is
available from Ulrich's Bookstore on S. University. Ask for Physics 406,
Prof. Newman, Bin #1081. Price is $11.61 plus tax. The course pack
consists of seven chapters from the book Equilibrium
Thermodynamics, 3rd edition, C. J. Adkins (Cambridge University Press,
Cambridge, 1984). ISBN 0-5212-7456-7. This book is *not* required,
but if you want more detail on the thermodynamics part of the course you
may wish to look at it. A copy is on reserve at Science Library
Reserves in the Science Library.

**Supplementary texts (not required):**
Two other books that cover the same material from different viewpoints are:

- Statistical Physics, 2nd edition, Franz Mandl (John Wiley, New York, 1988). ISBN 0-471-91533-5.
- Fundamentals of Statistical and Thermal Physics, Frederick Reif (McGraw-Hill, Boston, 1965). ISBN 07-051800-9.

**Course work:** There will be weekly problem sets handed out Fridays
and due in a week later in class. The problem sets will also be available
for download from this web site no later than the Friday morning on which
they are handed out. The first problem set will be handed out on Friday,
September 10. There will be one mid-term and a final. The final will take
place on Monday, December 20 from 1:30pm to 3:30pm. Grade for the course
will be 40% on the problem sets, 25% on the mid-term, and 35% on the final.
The exams will be open-book, meaning you may bring the required texts to
them -- you cannot use your own written notes or solution sets to
coursework.

The summary sheet of equations for the final exam is here.

- Homework 1 - Zeroth and First Laws of Thermodynamics
- Homework 2 - Second Law of Thermodynamics and entropy
- Homework 3 - Applications of Thermodynamics
- Homework 4 - Counting states and combinatorics
- Homework 5 - Entropy and energy
- Homework 6 - The Boltzmann distribution and the ideal gas
- Homework 7 - Photon and phonon gases
- Homework 8 - Exchange of particles and the grand ensemble
- Homework 9 - Quantum gases
- Homework 10 - More quantum gases
- Homework 11 - Phase transitions

Click here for a printable version.

**Course pack (Adkins) 1.5 and 2.1-2.6:**Introduction to classical thermodynamics. Intensive and extensive thermodynamic variables, conjugate pairs. The zeroth law of thermodynamics, the derivation and definition of temperature.**Course pack (Adkins) 1.9:**Mathematical preliminaries, partial derivatives, the chain rule, the reciprocal and reciprocity theorems.**Course pack (Adkins) 3.1-3.7 (excluding 3.5.3):**The first law of thermodynamics, conservation of energy, heat and work, work done by pressure, surface tension, in a magnetic field. Heat capacity and enthalpy.**Course pack (Adkins) 4.1-4.3, 4.5, 4.6, 4.8:**The second law, Clausius' statement, heat engines, the Carnot engine, irreversibility of heat flow. Carnot's Theorem, the definition of thermodynamic temperature, refrigerators and heat pumps.**Course pack (Adkins) 5.1-5.6.1:**Clausius' Theorem, derivation of entropy, law of increase of entropy. Entropy form of the first law, degradation of energy, heat capacities, free energy, free expansion of a gas.**Course pack (Adkins) 7.1-7.3:**Thermodynamic potential functions, internal energy, enthalpy, Helmholtz and Gibbs free energies. Lagrange transforms. Maxwell relations.**Course pack (Adkins) 8.1-8.4, 8.6:**Applications of thermodynamics. Calculation of heat capacities, ratios, differences. Adiabatic expansion of the perfect gas. Elastic rods, springs, and filaments. Surface tension. Magnetic cooling.**Kittel and Kroemer, Ch. 1:**Counting quantum states, simple binary models, spin models, binary alloys. Spin excess, multiplicity, width of the distribution, multiplicity as a function of energy.**Kittel and Kroemer, Ch. 2:**Fundamental assumption of the microcanonical ensemble, many-systems view, the ergodic hypothesis. Systems in equilibrium, the derivation of temperature and entropy, Boltzmann's constant. Properties of entropy, the law of increase of entropy (again), maximization of entropy at equilibrium.**Kittel and Kroemer, Ch. 3, part 1:**Derivation of the Boltzmann distribution and the partition function. Entropy of the Boltzmann distribution, Gibbs-Shannon formula for the entropy, Helmholtz free energy. Minimization of the free energy.**Kittel and Kroemer, Ch. 3, part 2:**A particle in a box, many particles in a box, the perfect gas. Entropy of a perfect gas, the Gibbs correction, derivation of the equation of state. Sterling's approximation, the Sackur-Tetrode equation, entropy of mixing.**Kittel and Kroemer, Ch. 4:**The Planck distribution, black-body radiation and the Stefan-Boltzmann law. Color of thermal radiation. Phonon spectra, the Debye theory of the phonon specific heat.**Kittel and Kroemer, Ch. 5:**Gases with varying numbers of particles, chemical potential, generalization of the first law, chemical potential of the perfect gas, barometric pressure. The Gibbs distribution, the grand partition function, the grand potential.**Kittel and Kroemer, Ch. 6:**Quantum gases 1, the Fermi-Dirac distribution, the Bose-Einstein distribution, the classical limit, chemical potential, energy, pressure, and the ideal gas again.**Kittel and Kroemer, Ch. 7:**Quantum gases 2, the quantum limit. Fermi gases, electron gases, electronic heat capacity, astrophysical examples. Bose gases, Bose-Einstein condensation, liquid helium, superfluidity.**Advanced topics (time permitting):**Phase transitions, ferromagnetism, Landau theory; semiconductors, donors and acceptors, p-n junctions; spin models, Ising model, percolation; computer simulation methods, Monte Carlo methods; information theory.

Mark Newman