Here is a tentative list of materials to be covered

1/26 Dimensional Analysis (ch. 2)
1/27 Vector Analysis (ch. 22)
1/28 Vector Analysis (ch. 22)
2/2 Symmetric Operators and eigenvalues and eigenvectors (Ch. 13)
2/3 More on Eigenvalues and Eigenvectors (Ch. 13)
2/4 Transforamtion of operators, and definsion of tensors (Ch. 22)
2/9 Linear Algebra (ch. 13)
2/10 Linear Algebra (ch 13)
2/11 Introduction to Group theory (??)
2/16 Discrete Groups (??)
2/17 Contiuous groups (??)
2/18 Continous groups (??)
2/23 Spherical Coordinates (Ch. 4)
2/24 Gradient
2/25 First Mid Term
3/2 Divergence
3/3 Curl
3/4 Gauss Theorem
3/9 Stokes Theorem
3/10 Laplacian
3/11 Diffrential Equation
3/23 Diffrential Equation
3/24 Special Functions
3/25 Dirac Delta Function
3/30 Fourier analysis
3/31 Fourier analysis
4/1 Fourier analysis
4/6 Analytic function
4/7 Complex integral
4/8 Complex interal
4/13 Green's function
4/14 Green's function
4/15 SECOND MIDTERM
4/20 Green's function
4/21 normal modes
4/22 normal modes
4/27 potential theory
4/28 potential theory
4/29 Asymptotic evaluation of integrals
5/4 Asymptotic evalution of intergral
5/5 Variational calculus
5/6 Variational calculus
5/11 Review: problem solving

Final exam: 10:30am (2hr duration) Monday, May, 17