Math 46: Schedule, topics and worksheets - SPRING 2007

week date reading daily topics & demos worksheets
1 Mar 28 W website, 1.1 Dimensional analysis dimanal, solns
29 Th X-hr lin. algebra! problem session on dimensional analysis
30 F 1.2 Scaling scaling (w/ solns)
Apr 2 M 1.3 review ODE solution methods ode1
2 4 W 1.4 HW1 due. review 2D ODEs (phase plane), stability phaseplane
5 Th X-hr Matlab links numerical solution and plots of ODEs with Matlab, intro46.m
6 F 2.1.1-2 Regular perturbation regpert
9 M 2.1.3-4 Poincare-Linstedt method, asymptotic analysis, O(.) and o(.)
3 11 W 2.2 HW2 due. Singular perturbation dombal
12 Th X-hr -
13 F 2.3 Boundary layers and uniform approximation
16 M 2.4 Initial layers
4 18 W 2.5 HW3 due. WKB approximation wkb
19 Th X-hr -
20 F 2.6.1-2 WKB eigenvalues, asymptotic expansion of integrals wkbeig
23 M 2.6.3 Stationary phase integrals
5 25 W 4.1 HW4 due.Asymptotic expansion by parts.
26 Th X-hr - practise problems (also this)
Midterm 1: Thursday April 26, 6-8 pm, Kemeny 008. (solutions)
27 F 4.1 Orthogonal expansions & Fourier series
30 M 4.1 Uniform convergence, Bessel's inequality bessel
6 May 2 W 4.2 HW5 due. Sturm-Liouville problems.
3 Th X-hr -
4 F 4.3.2 Integral equations: Volterra equations volterra
7 M 4.3.3 Degenerate Fredholm equations
7 9 W 4.3.4 HW6 due. Symmetric Fredholm equations
10 Th X-hr - Review degenerate Fredholm
11 F 4.4 Hilbert-Schmidt theorem, Green's functions greens
14 M 4.4 Green's functions via eigenfunction expansion. Classifying PDEs.
8 16 W 6.1 HW7 due. Integrating simple PDEs, fundamental solution, heat equation on R. simple_pdes
17 Th X-hr - practise problems and integral equation review
Midterm 2: Thursday May 17, 6-8 pm, Kemeny 008 (solutions)
18 F 6.2.1-2 Conservation laws, Green's identities, heat equation on Rⁿ
21 M 6.2.3-5, 6.3 Energy method for uniqueness, Laplace's equation, maximum principle.
9 23 W 6.4 HW8 due. Eigenfunction (mode) expansions separable
24 Th X-hr 6.5.2 (replacing Monday lecture) The Fourier transform.
25 F 6.6 Convolution and Fourier transform solution of PDEs. conv
28 M (no lecture: Memorial Day)
10 30 W - HW9 due. Review (practise questions)
Final Exam: Friday June 1, 8-11am, Kemeny 108 (solutions)

week	date	reading	daily topics & demos	worksheets
1	Mar 28 W	website, 1.1	Dimensional analysis	dimanal, solns
	29 Th X-hr	lin. algebra!	problem session on dimensional analysis
	30 F	1.2	Scaling	scaling (w/ solns)
	Apr 2 M	1.3	review ODE solution methods	ode1
2	4 W	1.4	HW1 due. review 2D ODEs (phase plane), stability	phaseplane
	5 Th X-hr	Matlab links	numerical solution and plots of ODEs with Matlab, `intro46.m`
	6 F	2.1.1-2	Regular perturbation	regpert
	9 M	2.1.3-4	Poincare-Linstedt method, asymptotic analysis, O(.) and o(.)
3	11 W	2.2	HW2 due. Singular perturbation	dombal
	12 Th X-hr	-
	13 F	2.3	Boundary layers and uniform approximation
	16 M	2.4	Initial layers
4	18 W	2.5	HW3 due. WKB approximation	wkb
	19 Th X-hr	-
	20 F	2.6.1-2	WKB eigenvalues, asymptotic expansion of integrals	wkbeig
	23 M	2.6.3	Stationary phase integrals
5	25 W	4.1	HW4 due.Asymptotic expansion by parts.
	26 Th X-hr	-	practise problems (also this)
		Midterm 1: Thursday April 26, 6-8 pm, Kemeny 008. (solutions)
	27 F	4.1	Orthogonal expansions & Fourier series
	30 M	4.1	Uniform convergence, Bessel's inequality	bessel
6	May 2 W	4.2	HW5 due. Sturm-Liouville problems.
	3 Th X-hr	-
	4 F	4.3.2	Integral equations: Volterra equations	volterra
	7 M	4.3.3	Degenerate Fredholm equations
7	9 W	4.3.4	HW6 due. Symmetric Fredholm equations
	10 Th X-hr	-	Review degenerate Fredholm
	11 F	4.4	Hilbert-Schmidt theorem, Green's functions	greens
	14 M	4.4	Green's functions via eigenfunction expansion. Classifying PDEs.
8	16 W	6.1	HW7 due. Integrating simple PDEs, fundamental solution, heat equation on R.	simple_pdes
	17 Th X-hr	-	practise problems and integral equation review
		Midterm 2: Thursday May 17, 6-8 pm, Kemeny 008 (solutions)
	18 F	6.2.1-2	Conservation laws, Green's identities, heat equation on Rⁿ
	21 M	6.2.3-5, 6.3	Energy method for uniqueness, Laplace's equation, maximum principle.
9	23 W	6.4	HW8 due. Eigenfunction (mode) expansions	separable
	24 Th X-hr	6.5.2	(replacing Monday lecture) The Fourier transform.
	25 F	6.6	Convolution and Fourier transform solution of PDEs.	conv
	28 M		(no lecture: Memorial Day)
10	30 W	-	HW9 due. Review (practise questions)
		Final Exam: Friday June 1, 8-11am, Kemeny 108 (solutions)